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Exercicios resolvidos Maquinas Eletricas

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PROBLEM SOLUTIONS: Chapter 1
Problem 1.1
Part (a):
Rc =
lc
lc
=
=0
µAc
µr µ0 Ac
A/Wb
Rg =
g
= 1.017 × 106
µ0 Ac
A/Wb
part (b):
Φ=
NI
= 1.224 × 10−4
Rc + Rg
Wb
part (c):
λ = N Φ = 1.016 × 10−2
Wb
part (d):
L=
λ
= 6.775 mH
I
Problem 1.2
part (a):
Rc =
lc
lc
=
= 1.591 × 105
µAc
µr µ0 Ac
Rg =
g
= 1.017 × 106
µ0 Ac
A/Wb
A/Wb
part (b):
Φ=
NI
= 1.059 × 10−4
Rc + Rg
Wb
part (c):
λ = N Φ = 8.787 × 10−3
part (d):
L=
λ
= 5.858 mH
I
Wb
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Problem 1.3
part (a):
N=
Lg
= 110 turns
µ0 Ac
part (b):
I=
Bcore
= 16.6 A
µ0 N/g
Problem 1.4
part (a):
N=
L(g + lc µ0 /µ)
=
µ0 Ac
L(g + lc µ0 /(µr µ0 ))
= 121 turns
µ0 Ac
part (b):
I=
Bcore
= 18.2 A
µ0 N/(g + lc µ0 /µ)
Problem 1.5
part (a):
part (b):
3499
µr = 1 + = 730
1 + 0.047(2.2)7.8
I=B
g + µ0 lc /µ
µ0 N
= 65.8 A
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part (c):
Problem 1.6
part (a):
Hg =
NI
;
2g
Bc =
Ag
Ac
x
Bg = Bg 1 −
X0
part (b): Equations
2gHg + Hc lc = N I;
Bg Ag = Bc Ac
and
Bg = µ0 Hg ;
Bc = µHc
can be combined to give
 


N
I
N
I
=

Bg = 
Ag
µ0
x
(l
(l
1
−
+
l
)
+
l
)
2g + µµ0
2g
+
c
p
c
p
Ac
µ
X0
Problem 1.7
part (a):

part (b):
g+
I = B
µ0
µ
(lc + lp )
µ0 N

 = 2.15 A
1199
µ = µ0 1 + √
= 1012 µ0
1 + 0.05B 8

I = B
g+
µ0
µ
(lc + lp )
µ0 N

 = 3.02 A
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part (c):
Problem 1.8
g=
µ0 N 2 Ac
L
−
µ0
µ
lc = 0.353 mm
Problem 1.9
part (a):
lc = 2π(Ro − Ri ) − g = 3.57 cm;
Ac = (Ro − Ri )h = 1.2 cm2
part (b):
Rg =
g
= 1.33 × 107
µ0 Ac
A/Wb;
Rc = 0
A/Wb;
part (c):
L=
N2
= 0.319 mH
Rg + Rg
part (d):
I=
Bg (Rc + Rg )Ac
= 33.1 A
N
part (e):
λ = N Bg Ac = 10.5 mWb
Problem 1.10
part (a): Same as Problem 1.9
part (b):
Rg =
g
= 1.33 × 107
µ0 Ac
A/Wb;
Rc =
lc
= 3.16 × 105
µAc
A/Wb
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part (c):
N2
= 0.311 mH
Rg + Rg
L=
part (d):
I=
Bg (Rc + Rg )Ac
= 33.8 A
N
part (e): Same as Problem 1.9.
Problem 1.11
Minimum µr = 340.
Problem 1.12
L=
µ0 N 2 Ac
g + lc /µr
Problem 1.13
L=
µ0 N 2 Ac
= 30.5 mH
g + lc /µr
Problem 1.14
part (a):
Vrms =
ωN Ac Bpeak
√
= 19.2 V rms
2
part (b):
Irms =
Vrms
= 1.67 A rms;
ωL
√
Wpeak = 0.5L( 2 Irms )2 = 8.50 mJ
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Problem 1.15
part (a):
R3 =
R12 + R22 = 4.27 cm
part (b):
L=
µ0 Ag N 2
= 251 mH
g + µµ0 lc
part (c): For ω = 2π60 rad/sec and λpeak = N Ag Bpeak = 0.452 Wb:
(i)
(ii)
(iii)
Vrms = ωλpeak = 171 V rms
Vrms
= 1.81 A rms
Irms =
ωL √
Wpeak = 0.5L( 2Irms )2 = 0.817 J
part (d): For ω = 2π50 rad/sec and λpeak = N Ag Bpeak = 0.452 Wb:
(i)
(ii)
(iii)
Problem 1.16
part (a):
Vrms = ωλpeak = 142 V rms
Vrms
Irms =
= 1.81 A rms
ωL √
Wpeak = 0.5L( 2Irms )2 = 0.817 J
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part (b):
Emax = 4f N Ac Bpeak = 345 V
Problem 1.17
part (a):
N=
LI
= 99 turns;
Ac Bsat
g=
µ0 N I
µ0 lc
= 0.36 mm
−
Bsat
µ
part (b): From Eq.3.21
Wgap =
2
Ac gBsat
= 0.207 J;
2µ0
Wcore =
2
Ac lc Bsat
= 0.045 J
2µ
Thus Wtot = Wgap + Wcore = 0.252 J. From Eq. 1.47, (1/2)LI 2 = 0.252 J.
Q.E.D.
Problem 1.18
part (a): Minimum inductance = 4 mH, for which g = 0.0627 mm, N =
20 turns and Vrms = 6.78 V
part (b): Maximum inductance = 144 mH, for which g = 4.99 mm, N =
1078 turns and Vrms = 224 V
Problem 1.19
part (a):
L=
µ0 πa2 N 2
= 56.0 mH
2πr
part (b): Core volume Vcore ≈ (2πr)πa2 = 40.0 m3 . Thus
2
B
W = Vcore
= 4.87 J
2µ0
part (c): For T = 30 sec,
(2πrB)/(µ0 N )
di
=
= 2.92 × 103
dt
T
v=L
A/sec
di
= 163 V
dt
Problem 1.20
part (a):
Acu = fw ab;
part (b):
Volcu = 2ab(w + h + 2a)
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B = µ0
Jcu Acu
g
part (c):
Jcu =
NI
Acu
part (d):
2
Pdiss = Volcu ρJcu
part (e):
Wmag = Volgap
B2
2µ0
= gwh
B2
2µ0
part (f):
L
=
R
1
2
1
2
LI 2
=
RI 2
2Wmag
Wmag
µ0 whA2cu
=
=
1
Pdiss
ρgVolcu
2 Pdiss
Problem 1.21
Using the equations of Problem 1.20
Pdiss = 115 W
I = 3.24 A
N = 687 turns
R = 10.8 Ω
τ = 6.18 msec
Wire size = 23 AWG
Problem 1.22
part (a):
(i)
(ii)
(iii)
B1 =
µ0 N1 I1
;
g1
B2 =
µ0 N1 I1
g2
µ0 N12
λ1 = N1 (A1 B1 + A2 B2 ) =
A2
λ2 = N2 A2 B2 = µ0 N1 N2
I1
g2
A2
A1
+
g1
g2
I1
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part (b):
(i)
(ii)
(iii)
B1 = 0;
B2 =
µ0 N2 I2
g2
A2
λ1 = N1 A2 B2 = µ0 N1 N2
I2
g2
A2
λ2 = N2 A2 B2 = µ0 N22
I2
g2
part (c):
(i)
(ii)
(iii)
µ0 N1 I1
µ0 N2 I2
+
g2
g
2
A2
A
A2
1
λ1 = N1 (A1 B1 + A2 B2 ) = µ0 N12
I1 + µ0 N1 N2
I2
+
g1
g2
g2
A2
A2
λ2 = N2 A2 B2 = µ0 N1 N2
I1 + µ0 N22
I2
g2
g2
B1 =
µ0 N1 I1
;
g1
B2 =
part (d):
L11 = N12
A1
A2
+
g1
g2
;
L22 = µ0 N22
A2
g2
;
L12 = µ0 N1 N2
Problem 1.23
RA =
lA
;
µAc
R1 =
l1
;
µAc
R2 =
l2
;
µAc
Rg =
g
µ0 Ac
part (a):
L11 =
N12 µAc
N12
=
R1 + R2 + Rg + RA /2
l1 + l2 + lA /2 + g (µ/µ0 )
A2
g2
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LAA = LBB =
lA + l1 + l2 + g (µ/µ0 )
N2
N 2 µAc
=
RA + RA ||(R1 + R2 + Rg )
lA
lA + 2(l1 + l2 + g (µ/µ0 ))
part (b):
LAB = LBA =
N 2 µAc
l1 + l2 + g (µ/µ0 )
N 2 (R1 + R2 + Rg )
=
RA (RA + 2(R1 + R2 + Rg ))
lA
lA + 2(l1 + l2 + g (µ/µ0 ))
LA1 = L1A = −LB1 = −L1B =
−N N1 µAc
−N N1
=
RA + 2(R1 + R2 + Rg )
lA + 2(l1 + l2 + g (µ/µ0 ))
part (c):
v1 =
d
d
[LA1 iA + LB1 iB ] = LA1 [iA − iB ]
dt
dt
Q.E.D.
Problem 1.24
part (a):
L12 =
µ0 N1 N2
[D(w − x)]
2g
part (b):
v2
N1 N2 µ0 D dx
dλ2
dL12
= I0
=−
dt
dt
2g
dt
N1 N2 µ0 D
ǫ ωw
= −
cos ωt
2g
2
=
Problem 1.25
part (a):
H=
N1 i1
N1 i1
=
2π(Ro + Ri )/2
π(Ro + Ri )
v2 =
dB
d
[N2 (tn∆)B] = N2 tn∆
dt
dt
part (b):
part (c):
vo = G
v2 dt = GN2 tn∆B
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Problem 1.26
Rg =
g
= 4.42 × 105
µ0 Ag
A/Wb;
Rc =
lc
333
A/Wb
=
µAg
µ
Want Rg ≤ 0.05Rc ⇒ µ ≥ 1.2 × 104 µ0 . By inspection of Fig. 1.10, this will be
true for B ≤ 1.66 T (approximate since the curve isn’t that detailed).
Problem 1.27
part (a):
N1 =
Vpeak
= 57 turns
ωt(Ro − Ri )Bpeak
part (b):
(i)
(ii)
Vo,peak
= 0.833 T
GN2 t(Ro − Ri )
V1 = N1 t(Ro − Ri )ωBpeak = 6.25 V, peak
Bpeak =
Problem 1.28
part (a): From the M-5 magnetization curve, for B = 1.2 T, Hm = 14 A/m.
Similarly, Hg = B/µ0 = 9.54 × 105 A/m. Thus, with I1 = I2 = I
I=
Hm (lA + lC − g) + Hg g
= 38.2 A
N1
part (b):
Wgap =
gAgap B 2
= 3.21 Joules
2µ0
part (c):
λ = 2N1 AA B = 0.168 Wb;
Problem 1.29
part (a):
L=
λ
= 4.39 mH
I
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part (b): Area = 191 Joules
part (c): Core loss = 1.50 W/kg.
Problem 1.30
Brms = 1.1 T and f = 60 Hz,
Vrms = ωN Ac Brms = 46.7 V
Core volume = Ac lc = 1.05 × 10−3 m3 . Mass density = 7.65 × 103 kg/m3 .
Thus, the core mass = (1.05 × 10−3 )(7.65 × 103 ) = 8.03 kg.
At B = 1.1 T rms = 1.56 T peak, core loss density = 1.3 W/kg and rms
VA density is 2.0 VA/kg. Thus, the core loss = 1.3 × 8.03 = 10.4 W. The total
exciting VA√for the core is 2.0 × 8.03 = 16.0 VA. Thus, its reactive component
is given by 16.02 − 10.42 = 12.2 VAR.
The rms energy storage in the air gap is
Wgap =
2
gAc Brms
= 3.61 Joules
µ0
corresponding to an rms reactive power of
VARgap = ωWgap = 1361 Joules
Thus, the total rms exciting VA for the magnetic circuit is
VArms = sqrt10.42 + (1361 + 12.2)2 = 1373 VA
and the rms current is Irms = VArms /Vrms = 29.4 A.
Problem 1.31
part(a): Area increases by a factor of 4. Thus the voltage increases by a
factor of 4 to e = 1096cos377t.
part (b): lc doubles therefore so does the current. Thus I = 0.26 A.
part (c): Volume increases by a factor of 8 and voltage increases by a factor
of 4. There Iφ,rms doubles to 0.20 A.
part (d): Volume increases by a factor of 8 as does the core loss. Thus
Pc = 128 W.
Problem 1.32
From Fig. 1.19, the maximum energy product for samarium-cobalt occurs at
(approximately) B = 0.47 T and H = -360 kA/m. Thus the maximum energy
product is 1.69 × 105 J/m3 .
Thus,
0.8
Am =
2 cm2 = 3.40 cm2
0.47
and
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lm = −0.2 cm
0.8
µ0 (−3.60 × 105 )
= 0.35 cm
Thus the volume is 3.40 × 0.35 = 1.20 cm3 , which is a reduction by a factor
of 5.09/1.21 = 4.9.
Problem 1.33
From Fig. 1.19, the maximum energy product for neodymium-iron-boron
occurs at (approximately) B = 0.63 T and H = -470 kA/m. Thus the maximum
energy product is 2.90 × 105 J/m3 .
Thus,
0.8
Am =
2 cm2 = 2.54 cm2
0.63
and
lm = −0.2 cm
0.8
µ0 (−4.70 × 105 )
= 0.27 cm
Thus the volume is 2.54 × 0.25 = 0.688 cm3 , which is a reduction by a factor
of 5.09/0.688 = 7.4.
Problem 1.34
From Fig. 1.19, the maximum energy product for samarium-cobalt occurs at
(approximately) B = 0.47 T and H = -360 kA/m. Thus the maximum energy
product is 1.69 × 105 J/m3 . Thus, we want Bg = 1.2 T, Bm = 0.47 T and
Hm = −360 kA/m.
Hg
Bg
hm = −g
= −g
= 2.65 mm
Hm
µ0 Hm
Am = Ag
Bg
Bm
Rm =
= 2πRh
Bg
Bm
= 26.0 cm2
Am
= 2.87 cm
π
Problem 1.35
From Fig. 1.19, the maximum energy product for neodymium-iron-boron occurs at (approximately) Bm = 0.63 T and Hm = -470 kA/m. The magnetization
curve for neodymium-iron-boron can be represented as
Bm = µR Hm + Br
where Br = 1.26 T and µR = 1.067µ0. The magnetic circuit must satisfy
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Hm d + Hg g = N i;
Bm Am = Bg Ag
part (a): For i = 0 and Bg = 0.5 T, the minimum magnet volume will occur
when the magnet is operating at the maximum energy point.
Bg
Ag = 4.76 cm2
Am =
Bm
d=−
Hg
Hm
g = 1.69 mm
part (b):
i=
dA
Bg µR Agm +
N
g
µ0
−
Br d
µR
For Bg = 0.75, i = 17.9 A.
For Bg = 0.25, i = 6.0 A.
Because the neodymium-iron-boron magnet is essentially linear over the operating range of this problem, the system is linear and hence a sinusoidal flux
variation will correspond to a sinusoidal current variation.
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PROBLEM SOLUTIONS: Chapter 2
Problem 2.1
At 60 Hz, ω = 120π.
primary: (Vrms )max = N1 ωAc (Brms )max = 2755 V, rms
secondary: (Vrms )max = N2 ωAc (Brms )max = 172 V, rms
At 50 Hz, ω = 100π. Primary voltage is 2295 V, rms and secondary voltage is
143 V, rms.
Problem 2.2
√
2Vrms
= 167 turns
N=
ωAc Bpeak
Problem 2.3
N=
75
=3
8
turns
Problem 2.4
Resistance seen at primary is R1 = (N1 /N2 )2 R2 = 6.25Ω. Thus
I1 =
V1
= 1.6 A
R1
and
V2 =
N2
N1
V1 = 40 V
Problem 2.5
The maximum power will be supplied to the load resistor when its impedance, as reflected to the primary of the ideal transformer, equals that of
the source (2 kΩ). Thus the transformer turns ratio N to give maximum power
must be
Rs
N=
= 6.32
Rload
Under these conditions, the source voltage will see a total resistance of Rtot =
4 kΩ and the current will thus equal I = Vs /Rtot = 2 mA. Thus, the power
delivered to the load will equal
Pload = I 2 (N 2 Rload ) = 8
mW
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Here is the desired MATLAB plot:
Problem 2.6
The maximum power will be supplied to the load resistor when its impedance, as reflected to the primary of the ideal transformer, equals that of
the source (2 kΩ). Thus the transformer turns ratio N to give maximum power
must be
Rs
= 6.32
N=
Rload
Under these conditions, the source √
voltage will see a total impedance of Ztot =
2 kΩ. The current will thus equal I =
2 + j2 kΩ whose
magnitude
is
2
√
Vs /|Ztot | = 2 2 mA. Thus, the power delivered to the load will equal
Pload = I 2 (N 2 Rload ) = 16 mW
Here is the desired MATLAB plot:
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Problem 2.7
V2 = V1
Xm
Xl1 + Xm
= 266 V
Problem 2.8
part (a): Referred to the secondary
Lm,2 =
Lm,1
= 150 mH
N2
part(b): Referred to the secondary, Xm = ωLm,2 = 56.7 Ω, Xl2 = 84.8 mΩ
and Xl1 = 69.3 mΩ. Thus,
Xm
(i) V1 = N
V2 = 7960 V
Xm + Xl2
and
(ii) Isc =
V2
V2
=
= 1730 A
Xsc
Xl2 + Xm ||Xl1
Problem 2.9
part (a):
V1
= 3.47 A;
I1 =
Xl1 + Xm
V2 = N V1
Xm
Xl1 + Xm
= 2398 V
part (b): Let Xl′2 = Xl2 /N 2 and Xsc = Xl1 + Xm ||(Xm + Xl′2 ). For Irated =
50 kVA/120 V = 417 A
V1 = Irated Xsc = 23.1 V
I2 =
1
N
Xm
Xm + Xl2
Irated = 15.7 A
Problem 2.10
IL =
Pload
= 55.5 A
VL
and thus
IH =
IL
= 10.6 A;
N
VH = N VL + jXH IH = 2381 9.6◦
The power factor is cos (9.6◦ ) = 0.986 lagging.
V
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Problem 2.11
part (a):
part (b):
30 kW jφ
Iˆload =
e = 93.8 ejφ
230 V
A
where φ is the power-factor angle. Referred to the high voltage side, IˆH =
9.38 ejφ A.
V̂H = ZH IˆH
Thus, (i) for a power factor of 0.85 lagging, VH = 2413 V and (ii) for a power
factor of 0.85 leading, VH = 2199 V.
part (c):
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Problem 2.12
part (a):
part (b): Following methodology of Problem 2.11, (i) for a power factor of
0.85 lagging, VH = 4956 V and (ii) for a power factor of 0.85 leading, VH =
4000 V.
part (c):
Problem 2.13
part (a): Iload = 160 kW/2340 V = 68.4 A at
= cos−1 (0.89) = 27.1◦
V̂t,H = N (V̂L + Zt IL )
which gives VH = 33.7 kV.
part (b):
V̂send = N (V̂L + (Zt + Zf )IL )
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which gives Vsend = 33.4 kV.
part (c):
∗
Ssend = Psend + jQsend = V̂send Iˆsend
= 164 kW − j64.5 kVAR
Thus Psend = 164 kW and Qsend = −64.5 kVAR.
Problem 2.14
Following the methodology of Example 2.6, efficiency = 98.4 percent and
regulation = 1.25 percent.
Problem 2.15
part (a):
|Zeq,L | =
Vsc,L
= 107.8 mΩ
Isc,L
Req,L =
Psc,L
= 4.78 mΩ
2
Isc,L
Xeq,L =
2
|Zeq,L |2 − Req,L
= 107.7 mΩ
and thus
Zeq,L = 4.8 + j108 mΩ
part (b):
Req,H = N 2 Req,L = 0.455 Ω
Xeq,H = N 2 Xeq,L = 10.24 Ω
Zeq,H = 10.3 + j0.46 mΩ
part (c): From the open-circuit test, the core-loss resistance and the magnetizing reactance as referred to the low-voltage side can be found:
Rc,L =
Soc,L = Voc,L Ioc,L = 497 kVA;
and thus
2
Voc,L
= 311 Ω
Poc,L
Qoc,L =
2
2
Soc,L
− Poc,L
= 45.2 kVAR
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Xm,L =
2
Voc,L
= 141 Ω
Qoc,L
The equivalent-T circuit for the transformer from the low-voltage side is
thus:
part (d): We will solve this problem with the load connected to the highvoltage side but referred to the low-voltage side. The rated low-voltage current
is IL = 50 MVA/8 kV = 6.25 kA. Assume the load is at rated voltage. Thus
the low-voltage terminal voltage is
VL = |Vload + Zeq,L IL | = 8.058 kV
and thus the regulation is given by (8.053-8)/8 = 0.0072 = 0.72 percent.
The total loss is approximately equal to the sum of the open-circuit loss and
the short-circuit loss (393 kW). Thus the efficiency is given by
η=
50.0
Pload
=
= 0.992 = 99.2 percent
Pin
50.39
part (e): We will again solve this problem with the load connected to the
high-voltage side but referred to the low-voltage side. Now, IˆL = 6.25 25.8◦ kA.
Assume the load is at rated voltage. Thus the low-voltage terminal voltage is
VL = |Vload + Zeq,L IˆL | = 7.758 kV
and thus the regulation is given by (7.758-8)/8 = -0.0302 = -3.02 percent. The
efficiency is the same as that found in part (d), η = 99.2 percent.
Problem 2.16
√
The core length of the second transformer is is 2 times that of the first, its
core
√ area of the second transformer is twice that of the first, and its volume is
2 2 times that of the first. Since the voltage applied to the second transformer
is twice that of the first, the flux densitities will be the same. Hence, the core
loss will be proportional to the volume and
√
Coreloss = 2 23420 = 9.67 kW
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The magnetizing inductance is proportional
to the area and inversely pro√
portional to the core length√and hence is 2 times larger. Thus the no-load
magnetizing current will be 2 times larger in the second transformer or
√
Ino−load = 2 4.93 = 6.97 A
Problem 2.17
part (a): Rated current at the high-voltage side is 20 kVA/2.4 kV = 8.33 A.
Thus the total loss will be Ploss = 122 + 257 = 379 W. The load power is equal
to 0.8 × 20 = 16 kW. Thus the efficiency is
η=
16
= 0.977 = 97.7 percent
16.379
part (b): First calculate the series impedance (Zeq,H = Req,H + jXeq,H ) of
the transformer from the short-circuit test data.
Req,H =
Psc,H
= 3.69 Ω
2
Isc,H
Ssc,H = Vsc,H Isc,H = 61.3 × 8.33 = 511 kV A
Thus Qsc,H =
2
2
Ssc,H
− Psc,H
= 442 VAR and hence
Xeq,H =
Qsc,H
= 6.35 Ω
2
Isc,H
The regulation will be greatest when the primary and secondary voltages of
the transformer are in phase as shown in the following phasor diagram
Thus the voltage drop across the transformer will be equal to ∆V = |Iload ||Zeq,H | =
61.2 V and the regulation will equal 61.2 V/2.4 kV = 0.026 = 2.6 percent.
Problem 2.18
For a power factor of 0.87 leading, the efficiency is 98.4 percent and the
regulation will equal -3.48 percent.
Problem 2.19
part (a): The voltage rating is 2400 V:2640 V.
part (b): The rated current of the high voltage terminal is equal to that of
the 240-V winding, Irated = 30 × 103/240 = 125 A. Hence the kVA rating of the
transformer is 2640 × 125 = 330 kVA.
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Problem 2.20
part (a):
part (b): The rated current of the high voltage terminal is equal to that of
the 120-V winding, Irated = 104 /120 = 83.3 A. Hence the kVA rating of the
transformer is 600 × 83.3 = 50 kVA.
part (c): The full load loss is equal to that of the transformer in the conventional connection, Ploss = (1 − 0.979) 10 kW = 210 W. Hence as an autotransformer operating with a load at 0.85 power factor (Pload = 0.85 × 50 kW =
42.5 kW), the efficiency will be
η=
42.5 kW
= 0.995 = 99.5 percent
42.71 kW
Problem 2.21
part (a): The voltage rating is 78 kV:86 kV. The rated current of the high
voltage terminal is equal to that of the 8-kV winding, Irated = 50 × 106 /8000 =
6.25 kA. Hence the kVA rating of the transformer is 86 kV × 6.25 kA =
537.5 MVA.
part (b): The loss at rated voltage and current is equal to 393 kW and hence
the efficiency will be
η=
537.5 MW
= 0.9993 = 99.93 percent
538.1 MW
Problem 2.22
No numerical result required for this problem.
Problem 2.23
part (a): 7.97 kV:2.3 kV; 191 A:651 A; 1500 kVA
part (b): 13.8 kV:1.33 kV; 109 A:1130 A; 1500 kVA
part (c): 7.97 kV:1.33 kV; 191 A:1130 A; 1500 kVA
part (d): 13.8 kV:2.3 kV; 109 A:651 A; 1500 kVA
Problem 2.24
part (a):
(i) 23.9 kV:115 kV, 300 MVA
(ii) Zeq = 0.0045 + j0.19 Ω
(iii) Zeq = 0.104 + j4.30 Ω
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part (b):
(i) 23.9 kV:66.4 kV, 300 MVA
(ii) Zeq = 0.0045 + j0.19 Ω
(iii) Zeq = 0.0347 + j1.47 Ω
Problem 2.25
Following the methodology of Example 2.8, Vload = 236 V, line-to-line.
Problem 2.26
The total series impedance is Ztot = Zf + Zt = j11.7 + 0.11 + j2.2 Ω =
0.11 + j13.9 Ω. The transformer turns ratio is N = 9.375. The load current, as
referred to the transformer high-voltage side will be
325 MVA
Iload = N 2 √
ejφ = 7.81ejφ kA
3 24 kV
−1
◦
where
√ φ = − cos 0.93 = −21.6 . The line-to-neutral load voltage is Vload =
24 3 kV.
part (a): At the transformer high-voltage terminal
V =
√
3 |N Vload + Iload Zt | = 231.7 kV, line-to-line
part (b): At the sending end
V =
√
3 |N Vload + Iload Ztot | = 233.3 kV, line-to-line
Problem 2.27
Problem 2.28
First calculate the series impedance (Zeq,H = Req,H + jXeq,H ) of the transformer from the short-circuit test data.
Zeq,H = 0.48 = j1.18 Ω
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The total imedance between the load and the sending end of the feeder is Ztot√=
Zf + Zeq,H = 0.544 + j2.058 Ω. The transformer turns ration is N = 2400:120 3
= 11.6.
part (a): The referred load voltage Vload and current Iload will be in phase
and can be assumed to be the phase reference. Thus we can write the phasor
equation for the sending-end voltage as:
V̂s = Vload + Iload Ztot
√
We know that Vs = 2400/sqrt3 = 1386 V and that Iload = 100 kVA/( 32.4 kV).
Taking the magnitude of both sides of the above equation gives a quadradic
equation in Vload
2
2
Vload
+ 2Rtot Iload Vload + |Ztot |2 Iload
− Vs2
which can be solved for Vload
Vload = −Rtot Iload +
Vs2 − (Xtot Iload )2 = 1.338 kV
Referred to the low-voltage side, this corresponds to a load voltage of 1.338 kV/N =
116 V, line-to-neutral or 201 V, line-to-line.
part (b):
2400 = 651 A
Feeder current = √
3Ztot 651
HV winding current = √ = 376 A
3
LV winding current = 651N = 7.52 kA
Problem 2.29
part (a): The transformer turns ratio is N = 7970/120 = 66.4. The secondary voltage will thus be
V1
jXm
V̂2 =
= 119.74 0.101◦
N R1 + jX1 + jXm
part (b): Defining RL′ = N 2 RL = N 2 1 kΩ = 4.41 MΩ and
Zeq = jXm ||(R2′ + RL′ + jX2′ ) = 134.3 + j758.1 kΩ
the primary current will equal
Iˆ1 =
7970
= 10.3 − 79.87◦ mA
R1 + jX1 + Zeq
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The secondary current will be equal to
jXm
ˆ
ˆ
I2 = N I1
= 119.7 0.054◦
R2′ + RL′ + j(Xm + X2 )
mA
and thus
V̂2 = RL Iˆ2 = 119.7 0.054◦
V
part (c): Following the methodology of part (b)
V̂2 = 119.6 0.139◦
V
Problem 2.30
This problem can be solved iteratively using MATLAB. The minimum reactance is 291 Ω.
Problem 2.31
part (a):
part (b):
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Problem 2.32
part (a): The transformer turns ratio N = 200/5 = 40. For I1 = 200 A
I1
jXm
I2 =
= 4.987 0.024◦
N R2′ + j(Xm + X2′ )
part (b): Defining RL′ = N 2 250µΩ = 0.4 Ω
I1
jXm
I2 =
= 4.987 0.210◦
N R2′ + RL′ + j(Xm + X2′ )
Problem 2.33
part (a):
part (b):
Problem 2.34
Zbase,L =
Zbase,H =
2
Vbase,L
Pbase
2
Vbase,H
Pbase
= 1.80 Ω
= 245 Ω
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Thus
R1 = 0.0095Zbase,L = 17.1 mΩ;
X1 = 0.063Zbase,L = 113 mΩ
Xm = 148Zbase,L = 266 Ω
R2 = 0.0095Zbase,H = 2.33 Ω;
X2 = 0.063Zbase,H = 15.4 Ω
Problem 2.35
part (a):
(i) Zbase,L =
(7.97 × 103 )2
= 0.940 Ω;
75 × 103
(ii) Zbase,H =
(7970)2
= 847 Ω;
75 × 103
XL = 0.12Zbase,L = 0.113 Ω
XH = 0.12Zbase,H = 102 Ω
part (b):
(i) 797 V:13.8 kV, 225 kVA
(ii) Xpu = 0.12
(iii) XH = 102 Ω
(iv) XL = 0.339 Ω
part (c):
(i) 460 V:13.8 kV, 225 kVA
(ii) Xpu = 0.12
(iii) XH = 102 Ω
(iv) XL = 0.113 Ω
Problem 2.36
part (a): In each case, Ipu = 1/0.12 = 8.33 pu.
√
√
(i) Ibase,L = Pbase /( 3 Vbase,L ) = 225 kVA/( 3 797 V) = 163 A
IL = Ipu Ibase,L
√ = 1359 A
√
(ii) Ibase,H = Pbase /( 3 Vbase,H ) = 225 kVA/( 3 13.8 kV) = 9.4 A
IH = Ipu Ibase,H = 78.4 A
part (b): In each case, Ipu = 1/0.12 = 8.33 pu.
√
√
(i) Ibase,L = Pbase /( 3 Vbase,L ) = 225 kVA/( 3 460 V) = 282 A
IL = Ipu Ibase,L
√ = 2353 A
√
(ii) Ibase,H = Pbase /( 3 Vbase,H ) = 225 kVA/( 3 13.8 kV) = 9.4 A
IH = Ipu Ibase,H = 78.4 A
29
Problem 2.37
part (a): On the transformer base
800 MVA
Pbase,t
Xgen =
1.57 =
1.57 = 1.27 pu
Pbase,g
850 MVA
part (b): On the transformer base, the power supplied to the system is Pout =
700/850 = 0.824 pu and the total power is Sout = Pout /pf = 0.825/0.95 =
0.868 pu. Thus, the per unit current is Iˆ = 0.868 φ, where φ = − cos−1 0.95 =
−18.2◦.
(i) The generator terminal voltage is thus
ˆ t = 1.03 3.94◦ pu = 26.8 3.94◦ kV
V̂t = 1.0 + IZ
and the generator internal voltage is
ˆ t + Zgen ) = 2.07 44.3◦ pu = 53.7 44.3◦ kV
V̂gen = 1.0 + I(Z
(ii) The total output of the generator is given by Sgen = V̂t Iˆ∗ = 0.8262 +
0.3361. Thus, the generator output power is Pgen = 0.8262 × 850 = 702.2 MW.
The correspoinding power factor is Pgen /|Sgen | = 0.926 lagging.
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PROBLEM SOLUTIONS: Chapter 3
Problem 3.1
By analogy to Example 3.1,
T = 2B0 Rl [I1 sin α + I2 cos α] = 6.63 × 10−2 [I1 sin α + I2 cos α]
N·m
Thus
part (a): T = 0.530 cos α N·m
part (b): T = 0.530 sin α N·m
part (c): T = 0.530 [I1 sin α + I2 cos α] N·m
Problem 3.2
T = 0.5304 N·m
Problem 3.3
Can calculate the inductance as
L=
1000 × 0.13
Nφ
=
= 13 H
I
10
Thus
Wfld =
1
LI 2 = 650 Joules
2
Problem 3.4
part (a): For x = 0.9 mm, L = 29.5 mH and thus, for I = 6 A, Wfld =
0.531 Joules.
part (b):For x = 0.9 mm, L = 19.6 mH and thus, for I = 6 A, Wfld =
0.352 Joules. Hence, ∆Wfld = −0.179 Joules.
Problem 3.5
For a coil voltage of 0.4 V, the coil current will equal I = 0.4/0.11 = 3.7 A.
Under the assumption that all electrical transients have died out, the solution
will be the same as that for Problem 3.4, with a current of 3.7 A instead of
6.0 A.
part (a): Wfld = 0.202 Joules
part (b): ∆Wfld = −0.068 Joules.
Problem 3.6
√
For x = x0 , L = L0 = 30 mH. The rms current is equal to Irms = I0 / 2
and thus
part (a):
< Wfld >=
1 2
LI
= 0.227 Joules
2 rms
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part (b):
2
R = 1.63 W
< Pdiss >= Irms
Problem 3.7
part (a):
Bg =
Wfld
!
=
Bg2
2µ0
=
µ0 N 2 A0
4g
µ0 N i
2g
Bg2
2µ0
× Air-gap volume =
1−
4θ
π
2 !
!
i2
part (b):
2Wfld
µ0 N 2 A0
L=
=
i2
2g
1−
4θ
π
2 !
Here is the MATLAB plot:
Problem 3.8
part (a):
vC (t) = V0 e−t/τ ;
τ = RC
2
part (b): Wfld = q 2 /(2C) = CvC
/2. Thus
Wfld (0) =
CV02
;
2
Wfld (∞) = 0
× 2gAg
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part (c)
iR (t) =
vC (t)
;
R
Wdiss =
Pdiss (t) = i2R (t)R =
Z
∞
Pdiss (t) dt =
0
V02 e−2t/τ
R
CV02
2
Problem 3.9
part (a):
iL (t) =
V0 −t/τ
e
;
R
τ=
L
R
part (b):
Wfld (0) =
V02 L
;
2R2
Wfld (∞) = 0
part (c)
Pdiss (t) = i2L (t)R =
Wdiss =
Z
V02 e−2t/τ
R
∞
Pdiss (t) dt =
0
V02 L
2R2
Problem 3.10
Given:
τ=
L
= 4.8 sec;
R
I 2 R = 1.3 MW
Thus
1 2 1
Li = L
2
2
i2 R
R
=
τ 2
i2 R = 6.24 MJoules
Problem 3.11
part (a): Four poles
part (b):
Tfld =
2
′
d
∂Wfld
I0
=
(L0 + L2 cos 2θm ) = −I02 L2 sin 2θm
∂θm
dθm 2
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Problem 3.12
part (a):
Bg =
µ0 N i
g + g1 R/(2h)
where g1 is the length of the fixed gap, l is its length and R is the radius of the
solenoid. Here is the MATLAB plot:
part (b):
2
Wfld = πR g
Here is the MATLAB plot:
Bg2
2µ0
!
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part (c): L = 2Wfld /i2 . Here is the MATLAB plot:
Problem 3.13
If the plunger is moved very slowly (i.e. idL/dt << Ldi/dt, the current will
be essentially constant and all of the change in stored energy will come from
the mechanical work applied to the plunger. Thus,
part (a):
Work = Wfld (g = 0.2 cm) − Wfld (g = 2.25 cm) = 46.7 µJoules
part (b): The battery will supply only the energy dissipated in the coil.
Problem 3.14
The coil inductance is equal to L = µ0 N 2 Ac /(2g) and hence the lifting force
is equal to
i2 dL
µ0 N 2 Ac 2
ffld =
i
=−
2 dg
4g 2
where the minus sign simply indicates that the force acts in the direction to
reduce the gap (and hence lift the mass). The required force is equal to 931 N
(the mass of the slab times the acceleration due to gravity, 9.8 m/sec2 ). Hence,
setting g = gmim and solving for i gives
s
ffld
2gmin
= 385 mA
imin =
N
µ0 Ac
and vmin = imin R = 1.08 V.
Problem 3.15
part (a):
a1 = −9.13071 × 10−5 a2 = 0.124209 a3 = 28.1089
a4 = 10558.2
b1 = 9.68319 × 10−11 b2 = −1.37037 × 10−7
b3 = 6.32831 × 10−5 b4 = 1.71793 × 10−3
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part (b): (i) Here is the MATLAB plot:
(ii)
′
Wfld = 13.0 Joules and Wfld
= 13.7 Joules
′
Assuming no core relctance, Wfld = 11.8 Joules and Wfld
= 13.0 Joules
part (c): (i) Here is the MATLAB plot:
(ii)
′
Wfld = 142 Joules and Wfld
= 148 Joules
′
Assuming no core relctance, Wfld = 139 Joules and Wfld
= 147 Joules
Problem 3.16
µ0 N 2 Ac
;
L=
g
ffld =
i2
2
dL
i2 L
=−
dg
2g
The time-averaged force can be found by setting i = Irms where Irms = Vrms /(ωL).
Thus
< ffld >= −
V2
Irms
= −115 N
= − 2 rms 2
2
2gω L
2ω µ0 N Ac
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Because the inductor is being driven by a voltage source, the gap flux density
remains constant independent of the air-gap length and hence the force also
remains constant.
Problem 3.17
part (a):
Bs =
µ0 i
s
part (b):
φs = Bs xl =
µ0 xl
s
part (c): Note that as the coil moves upward in the slot, the energy associated
with the leakage flux associated withing the coil itself remains constant while
the energy in the leakage flux above the coil changes. Hence to use the energy
method to calculate the force on the coil it is necessary only to consider the
energy in the leakage flux above the slot.
Wfld =
Z
Bs2
µ0 xli2
dV =
2µ0
2s
Because this expression is explicity in terms of the coil current i and becasue
the magnetic energy is stored in air which is magnetically linear, we know that
′
= Wfld . We can therefore find the force from
Wfld
ffld =
′
µ0 li2
dWfld
=
dx
2s
This force is positive, acting to increase x and hence force the coil further into
the slot.
part (d): ffld = 18.1 N/m.
Problem 3.18
′
Wfld
=
µ0 H 2
2
× coil volume =
µ0 πr02 N 2
2h
Thus
′
dWrmf
ld
f=
=
dr0
µ0 πr0 N 2
h
and hence the pressure is
P =
f
=
2πr0 h
µ0 N 2
2h2
I02
I02
i2
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The pressure is positive and hence acts in such a direction as to increase the
coil radius r0 .
Problem 3.19
part (a):
Wfld (q, x) =
Z
q
v(q ′ , x)dq ′
0
part (b):
ffld = −
∂Wfld
∂x
q
part (c):
′
′
Wfld
= vq − dWfld ⇒ dWfld
= qdv + ffld dx
Thus
′
Wfld
=
Z
v
q(v ′ , x)dv ′ ;
ffld =
0
′
∂Wfld
∂x
v
Problem 3.20
part (a):
Wfld =
′
Wfld
=
Z
Z
q
v(q ′ , x)dq ′ =
0
v
q(v ′ , x)dv ′ =
0
xq 2
q2
=
2C
2ǫ0 A
ǫ0 Av 2
Cv 2
=
2
2x
part (b):
′
∂Wfld
∂x
ffld =
=
v
Cv 2
ǫ0 Av 2
=
2
2x2
and thus
ffld (V0 , δ) =
ǫ0 AV02
2δ 2
Problem 3.21
part (a):
Tfld =
2
Vdc
2
dC
=
dθ
Rd
2g
2
Vdc
part (b): In equilibrium, Tfld + Tspring = 0 and thus
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θ = θ0 +
Rd
2gK
2
Vdc
Here is the plot:
Problem 3.22
part (a):
µ0 N12 A
;
2g0
L11 =
L22 =
µ0 N22 A
2g0
part (b):
L12 =
µ0 N1 N2 A
;
2g0
part (c):
′
Wfld
=
1
1
µ0 A
2
L11 i21 + L22 i22 + L12 i1 i2 =
(N1 i1 + N2 i2 )
2
2
4g0
part (d):
ffld =
′
∂Wfld
∂g0
i1 ,i2
=−
µ0 A
(N1 i1 + N2 i2 )2
4g02
Problem 3.23
part (a):
′
Wfld
=
1
1
L11 i21 + L22 i22 + L12 i1 i2 = I 2 (L11 + L22 + 2L12 ) sin2 ωt
2
2
Tfld =
′
∂Wfld
∂θ
i1 ,i2
= −4.2 × 10−3 I 2 sin θ sin2 ωt N·m
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part (b):
Tfld = −2.1 × 10−3 I 2 sin θ
N·m
part (c): Tfld = −0.21 N·m.
part (d):
part (e): The curve of spring force versus angle is plotted as a straight line on
the plot of part (d). The intersection with each curve of magnetic force versus
angle gives the equilibrium angle for that value of current. For greater accuracy,
MATLAB can be used to search for the equilibrium points. The results of a
MATLAB analysis give:
I
5
7.07
10
part (f):
θ
52.5◦
35.3◦
21.3◦
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Problem 3.24
part (a):
Tfld = i1 i2
dL12
= −2.8i1i2 sin θ
dθ
λ2 = 0 ⇒ i 2 = −
L12
L22
N·m
i1 = −1.12i1 cos θ
Therefore, for i1 = 10 sin ωt,
Tfld
= −3.14i21 sin θ cos θ = −314 sin2 (ωt) sin θ cos θ
= −78.5 (1 − cos (2ωt)) sin (2θ) N·m
part (b):
< Tfld >= −78.5 N·m
part (c): It will not rotate. It will come to rest at angular positions where
< Tfld >= 0
and
d < Tfld >
=0
dθ
i.e. at θ = 90◦ or θ = 270◦.
Problem 3.25
part (a): Winding 1 produces a radial magnetic which, under the assumption
that g << r0 ,
Br,1 =
µ0 N1
i1
g
The z-directed Lorentz force acting on coil 2 will be equal to the current in coil
2 multiplied by the radial field Br,1 and the length of coil 2.
fz = 2πr0 N2 Br,1 i2 =
2πr0 µ0 N1 N2
i1 i2
g
part (b): The self inductance of winding 1 can be easily written based upon
the winding-1 flux density found in part (a)
L11 =
2πr0 lµ0 N12
g
The radial magnetic flux produced by winding 2 can be found using Ampere’s
law and is a function of z.

0≤z≤x

 0
µ0 N2 i2 (z−x)
−
x ≤z ≤x+h
Bz =
gh

 − µ0 N2 i2
x+h≤z ≤l
g
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Based upon this flux distribution, one can show that the self inductance of
coil 2 is
2h
2πr0 µ0 N22
l−x−
L22 =
g
3
part (c): Based upon the flux distribution found in part (b), the mutual
inductance can be shown to be
2πr0 µ0 N1 N2
h
L12 =
x+ −l
g
2
part (d):
ffld
d
=
dx
πr0 µ0 N22 2 2πr0 µ0 N1 N2
1
1
2
2
i1 i2
L11 i1 + L22 i2 + L12 i1 i2 = −
i2 +
2
2
g
g
Note that this force expression includes the Lorentz force of part (a) as well
as a reluctance force due to the fact that the self inductance of coil 2 varies with
position x. Substituting the given expressions for the coil currents gives:
ffld = −
πr0 µ0 N22 2
2πr0 µ0 N1 N2
I2 cos2 ωt +
I1 I2 cos ωt
g
g
Problem 3.26
The solution follows that of Example 3.8 with the exception of the magnet
properties of samarium-cobalt replaced by those of neodymium-boron-iron for
which µR = 1.06µ0 , Hc′ = −940 kA/m and Br = 1.25 T.
The result is
-203 N at x = 0 cm
ffld =
-151 N at x = 0.5 cm
Problem 3.27
part (a): Because there is a winding, we don’t need to employ a “fictitious”
winding. Solving
Hm d + Hg g0 = N i;
Bm wD = Bg (h − x)D
in combination with the constitutive laws
Bm = µR (Hm − Hc );
Bg = µ0 Hg
gives
Bm =
µ0 (N i + Hc d)
dµ0
µR
+
wg0
(h−x)
Note that the flux in the magnetic circuit will be zero when the winding
current is equal to I0 = −Hc d/N . Hence the coenergy can be found from
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integrating the flux linkage of the winding from an initial state where it is zero
(i.e. with i = I0 ) to a final state where the current is equal to i. The flux
linkages are given by λ = N wDBm and hence
′
(i, x) =
Wfld
Z
i
λ(i′ , x)di′ =
I0
µ0 wDN
dµ0
wg0
µR + (h−x)
Hc d
N i2
+ Hc i +
2
2N
The force is then
ffld
2
′
Ni
dWfld
Hc d
−µ0 w2 DN g0
=
= µ d(h−x)
+ Hc i +
dx
2
2N
+ wg0 )2
( 0 µR
(i) for i = 0,
ffld =
′
dWfld
−µ0 w2 Dg0 (Hc d)2
= µ d(h−x)
dx
+ wg0 )2
2( 0 µR
where the minus sign indicates that the force is acting upwards to support the
mass against gravity.
(ii) The maximum force occurs when x = h
fmax = −
µ0 wD(Hc d)2
= −Mmaxa
2
where a is the acceleration due to gravity. Thus
Mmax =
µ0 wD(Hc d)2
2a
part (b): Want
f (Imin,x=h = −a
µ0 wD(Hc d)2
Mmax
=−
2
4
Substitution into the force expression of part (a) gives
Imin = (2 −
√
2)(−Hc d) = −0.59Hcd
Problem 3.28
part (a): Combining
Hm d + Hg g = 0;
Bg = µ0 Hg ;
gives
πr02 Bm = 2πr0 lBg
Bm = µR (Hm − Hrmc )
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43
Bg =
g+
−Hc dµ0
µ0
µR
2ld
r0
part (b): The flux linkages of the voice coil can be calculate in two steps.
First calculate the differential flux linkages of a differential section of the voice
coil of dN2 turns at height z ′ above the bottom of the voice coil (which is at
z = x).


Z l
′
(−H
dµ
)(2πr
)(l
−
z
)
c
0
0
 dN2
dλ2 = dN2
Bg (2πr0 )dz = 
2ld
z′
g + µµR0
r0
Recognizing that dN2 = (N2 /h)dz ′ we can now integrate over the coil to
find the total flux linkages
Z x+h
N2 (−Hc dµ0 )(2πr0 )(l − x − h/2)
λ2 =
dλ2 =
2ld
x
g + µµR0
r0
part (c): Note from part (a) that the magnet in this case can be replaced
by a winding of N1 i1 = −Hc d ampere-turns along with a region of length d and
permeability µR . Making this replacement from part (a), the self inductance of
the winding can be found
λ11 = N1 Φ11 = 2πr0 hN1 Bg =
and thus
L11 =
2πr0 hN12 dµ0
i1
2ld
g + µµR0
r0
2πr0 hN12 dµ0
2ld
g + µµR0
r0
Similar, the mutual inductance with the voice coil can be found from part
(b) as
L12 =
N1 λ 2
N2 N2 µ0 (2πr0 )(l − x − h/2)
λ2
=
=
2ld
i1
−Hc d
g + µ0
µR
r0
We can now find the coenergy (ignoring the term L22 i22 /2)
′
Wfld
=
=
1
L11 i21 + L12 i1 i2
2
µ0 N2 (−Hc d)(2πr0 d)(l − x − h2 )
µ0 (Hc d)2 πr0 h
+
i2
µ0
2ld
2ld
g + µµR0
g
+
r0
µR
r0
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part (d):
′
dWfld
µ0 N2 (−Hc d)(2πr0 d)
=−
2ld
dx
g + µ0
ffld =
µR
Problem 3.29
part (a):
π(R32 − R22 )Bm = πR12 Bx = 2πR1 hBg
Hm tm + Hx x + Hg g = 0;
Bg = µ0 Hg ;
r0
Bx = µ0 Hx ;
Bm = µR (Hm − Hc )
where µR = 1.05µ0 and Hc′ = −712 kA/m.
Solving gives


µ
R
(−H
t
)
0 1
c m
 = 0.562 T
Bg = 
2µ0 R21 htm
2hx + gR1 + µR (R2 −R2 )
3
2
and
Bx =
2h
R1
Bg = 0.535 T
part (b): We can replace the magnet by an equivalent winding of N i =
−Hc tm . The flux linkages of this equivalent winding can then be found to be


2 2
2πµ0 hR1 N
 i = Li
λ = N (2πR1 h)Bg = 
2µ0 R21 htm
2hx + gR1 + µR (R
2 −R2 )
3
2
The force can then be found as
ffld
=
=
i2 dL
=
2 dx
−2πµ0 (hR1 )2 (N i)2
2hx + gR1 +
2
−2πµ0 (hR1 )2 (−Hc tm )2
2 = −0.0158 N
2µ0 R21 htm
2hx + gR1 + µR (R
2 −R2 )
3
part (c):
2µ0 R21 htm
µR (R23 −R22 )
X0 = x −
2
f
= 4.0 mm
K
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Problem 3.30
part (a): If the plunger is stationary at x = 0.9a, the inductance will be
constant at L = 0.1L0 . Thus
i(t) =
V0 −t/τ
e
R
where τ = L/R.
The force will thus be
ffld
L0
i2 dL
=−
=
2 dx
2a
V0
R
2
e−2t/τ
part (b):
X0 = 0.9a +
L0
f
= 0.9a −
K0
2aK0
V0
R
2
Problem 3.31
part (a): Since the current is fixed at i = I0 = 4 A, the force will be constant
at f = −I02 L0 /()2a = −1.45 N. Thus
X0 = 0.9 ∗ a +
f
= 1.56 cm
K0
part (b):
M
d2 x
d2 x
=
f
+
K
(0.9a
−
x)
⇒
0.2
= 5.48 − 350x N
0
dt2
dt2
v = I0 R + I0
L0 dx
dx
dL
= I0 R −
⇒ v = 6 − 0.182
dt
a dt
dt
part (c): The equations can be linearized by letting x = X0 + x′ (t) and
v = V0 + v ′ (t). The result is
d2 x′
= −1750x′
dt2
and
v ′ = −0.182
dx′
dt
part (d) For ǫ in meters,
x′ (t) = ǫ cos ωt m
where ǫ =
√
1750 = 41.8 rad/sec and
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v ′ (t) = 7.61ǫ sin ωt
V
Problem 3.32
part (a): For a dc voltage of V0 = 6 V, the corresponding dc current will be
I0 = V0 /R = 4 A, the same as Problem 3.31. Hence the equilibrium position
will be the same; X0 = 1.56 cm.
part (b): For a fixed voltage, the dynamic equations become:
dx
L0
d
x di
i
−
V0 = iR + (Li) = iR + L0 1 −
dt
a dt
a
dt
or
6 = 1.5i + 4 × 10−3 (1 − 40x)
dx
di
− (0.182) i
dt
dt
and
d2 x
M 2 = f − K0 (0.9a − x) = −
dt
i2
2
L0
a
+ K0 (0.9a − x)
or
0.2
d2 x
= −0.0909i2 + 6.93 − 350x
dt2
part (c): The equations can be linearized by letting x = X0 + x′ (t) and
i = I0 + i′ (t). The result is
dx
X0 di′
L0
I0
0 = i′ R + L0 1 −
−
a
dt
a
dt
or
0 = 1.5i′ + 1.5 × 10−3
dx
di′
− 0.728
dt
dt
and
M
d2 x′
=−
dt2
I0 L0
a
i ′ − K 0 x′
or
0.2
d2 x
= −0.727i2 − 350x′
dt2
Problem 3.33
part (a): Following the derivation of Example 3.1, for a rotor current of 8 A,
the torque will be give by T = T0 sin α where T0 = −0.0048 N·m. The stable
equilibrium position will be at α = 0.
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part (b):
J
d2 α
= T0 sin α
dt2
part (c): The incremental equation of motion is
J
d2 α
= T0 α
dt2
and the natural frequency is
ω=
r
T0
= 0.62 rad/sec
J
corresponding to a frequency of 0.099 Hz.
Problem 3.34
As long as the plunger remains within the core, the inductance is equal to
µ0 dπN 2 a 2
− x2
L=
ag
2
where x is the distance from the center of the solenoid to the center of the core.
Hence the force is equal to
ffld =
µ0 dπN 2 i2 x
i2 dL
=−
2 dx
ag
Analogous to Example 3.10, the equations of motor are
ft = −M
d2 x
dx
µ0 dπN 2 i2 x
−
B
−
K(x
−
l
)
−
0
dt2
dt
ag
The voltage equation for the electric system is
di 2µ0 dπN 2 x dx
µ0 dπN 2 a 2
− x2
−
vt = iR +
ag
2
dt
ag
dt
These equations are valid only as long as the motion of the plunger is limited
so that the plunger does not extend out of the core, i.e. ring, say, between the
limits −a/2 < x < a/2.
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PROBLEM SOLUTIONS: Chapter 4
Problem 4.1
part (a): ωm = 1200 × π/30 = 40π rad/sec
part (b): 60 Hz; 120π rad/sec
part (c): 1200 × 5/6 = 1000 r/min
Problem 4.2
The voltages in the remaining two phases can be expressed as V0 cos (ωt − 2π/3)
and V0 cos (ωt + 2π/3).
Problem 4.3
part (a): It is an induction motor.
parts (b) and (c): It sounds like an 8-pole motor supplied by 60 Hz.
Problem 4.4
part (a):
part (b):
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part (c):
part (d):
Problem 4.5
Under this condition, the mmf wave is equivalent to that of a single-phase
motor and hence the positive- and negative-traveling mmf waves will be of equal
magnitude.
Problem 4.6
The mmf and flux waves will reverse direction. Reversing two phases is the
procedure for reversing the direction of a three-phase induction motor.
Problem 4.7
F1 = Fmax cos θae cos ωe t =
Fmax
(cos (θae − ωt ) + cos (θae + ωt ))
2
F2 = Fmax sin θae sin ωe t =
Fmax
(cos (θae − ωt ) − cos (θae + ωt ))
2
and thus
Ftotal = F1 + F2 = Fmax cos (θae − ωt )
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Problem 4.8
For n odd
R β/2
−β/2
R π/2
−π/2
For β = 5π/6,
cos (nθ)dθ
cos (nθ)dθ
= sin (

 0.97
nθ
0
sin ( ) =

2
0.26
nθ
)
2
n=1
n=3
n=5
Problem 4.9
part (a): Rated speed = 1200 r/min
part (b):
Ir =
πgBag1,peak (poles)
= 113 A
4µ0 kr Nr
part (c):
2
lRBag1,peak = 0.937 Wb
ΦP =
3
Problem 4.10
From the solution to Problem 4.9, ΦP = 0.937 Wb.
ωN Φ
Vrms = √ = 8.24 kV
2
Problem 4.11
From the solution to Problem 4.9, ΦP = 0.937 Wb.
Vrms =
ωkw Na Φ
√
= 10.4 kV
2
Problem 4.12
√
The required rms line-to-line voltage is Vrms = 13.0/ 3 = 7.51 kV. Thus
√
2 Vrms
= 39 turns
Na =
ωkw Φ
Problem 4.13
part (a): The flux per pole is
Φ = 2lRBag1,peak = 0.0159 Wb
The electrical frequency of the generated voltage will be 50 Hz. The peak voltage
will be
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Vpeak = ωN Φ = 388 V
Because the space-fundamental winding flux linkage is at is peak at time
t = 0 and because the voltage is equal to the time derivative of the flux linkage,
we can write
v(t) = ±Vpeak sin ωt
where the sign of the voltage depends upon the polarities defined for the flux
and the stator coil and ω = 120π rad/sec.
part (b): In this case, Φ will be of the form
Φ(t) = Φ0 cos2 ωt
where Φ0 = 0.0159 Wb as found in part (a). The stator coil flux linkages will
thus be
1
λ(t) = ±N Φ(t) = N Φ0 cos2 ωt = ± N Φ0 (1 + cos 2ωt)
2
and the generated voltage will be
v(t) = ∓ωΦ0 sin 2ωt
This scheme will not work since the dc-component of the coil flux will produce
no voltage.
Problem 4.14
Fa
= ia [A1 cos θa + A3 cos 3θa + A5 cos 5θa ]
= Ia cos ωt[A1 cos θa + A3 cos 3θa + A5 cos 5θa ]
Similarly, we can write
= ib [A1 cos (θa − 120◦ ) + A3 cos 3(θa − 120◦) + A5 cos 5(θa − 120◦ )]
Fb
= Ia cos (ωt − 120◦)[A1 cos (θa − 120◦ ) + A3 cos 3θa + A5 cos (5θa + 120◦ )]
and
Fc
= ic [A1 cos (θa + 120◦ ) + A3 cos 3(θa + 120◦ ) + A5 cos 5(θa + 120◦)]
= Ia cos (ωt + 120◦ )[A1 cos (θa + 120◦ ) + A3 cos 3θa + A5 cos (5θa − 120◦)]
The total mmf will be
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Ftot
= Fa + Fb + Fc
3
Ia [A1 cos (θa − ωt)A5 cos (5θa + ωt)]
=
2
3
ωt
=
Ia [A1 cos (θa − ωt)A5 cos 5 θa + ( ) ]
2
5
We see that the combined mmf contains only a fundamental space-harmonic
component that rotates in the forward direction at angular velocity ω and a 5’th
space-harmonic that rotates in the negative direction at angular velocity ω/5.
Problem 4.15
The turns must be modified by a factor of
9
1200
18
=
= 0.64
24
1400
14
Problem 4.16
Φp =
30Ea
= 6.25 mWb
N (poles)n
Problem 4.17
part (a):
2
2
2Bpeaklr =
× 2 × 1.25 × 0.21 × (.0952/2) = 12.5 mWb
Φp =
poles
4
Nph
√
(230/ 3) × 4
Vrms × poles
= 43 turns
=√
=√
2 πfme kw Φp
2 π × 60 × 0.925 × 0.0125
part (b): From Eq. B.27
16µ0 lr
L=
πg
kw Nph
poles
2
= 21.2 mH
Problem 4.18
part (a):
Φp = √
Vrms
= 10.8 mWb
2 πNph
Bpeak =
Φp
= 0.523 T
2lr
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part (b):
If =
πBpeak g
= 0.65 A
2µ0 kr Nr
part (c):
λa,peak
=
=
If
Laf
√
2 Vrms /ω
= 0.69 H
If
Problem 4.19
No numerical solution required.
Problem 4.20
Φpeak =
Tpeak
poles
2
2
Bpeak
4kr Nr Ir,max
π × poles
Fr,peak =
π
=
2
2Dl
poles
Φpeak Fr,peak = 4.39 × 106 N·m
Ppeak = Tpeakωm = 828 MW
Problem 4.21
Φpeak =
Fr,peak =
Tpeak
π
=
2
poles
2
2
2Dl
poles
Bpeak
4kr Nr Ir,max
π × poles
Φpeak Fr,peak = 16.1 N·m
Ppeak = Tpeak ωm = 6.06 kW
Problem 4.22
part (a):
T
dMaf
dMbf
+ ib if
dθ0
dθ0
= M if (ib cos θ0 − ia sin θ0 )
= ia if
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This expression applies under all operating conditions.
part (b):
√
T = 2M I02 (cos θ0 − sin θ0 ) = 2 2 M I02 sin (θ0 − π/4)
Provided there are any losses at all, the rotor will come to rest at θ0 = π/4 for
which T = 0 and dt/dθ0 < 0.
part (c):
T
=
=
√
√
2 M Ia If (sin ωt cos θ0 − cos ωt sin θ0 )
√
2 M Ia If sin (ωt − θ0 ) = 2 M Ia If sin δ
part (d):
d
(Laa ia + Maf if )
= Ra ia +
dt
√
2 Ia (Ra cos ωt − ωLaa sin ωt) − ωM If sin (ωt − δ)
=
va
d
(Laa ib + Mbf if )
= Ra ib +
dt
√
=
2 Ia (Ra sin ωt + ωLaa cos ωt) + ωM If cos (ωt − δ)
vb
Problem 4.23
T
= M If (ib cos θ0 − ia sin θ0 )
√
=
2 M If [(Ia + I ′ /2) sin δ + (I ′ /2) sin (2ωt + δ)]
The time-averaged torque is thus
< T >=
√
2 M If (Ia + I ′ /2) sin δ
Problem 4.24
part (a):
T
dLab
dMaf
dMbf
i2 dLbb
i2a dLaa
+ b
+ ia ib
+ ia if
+ ib if
2 dθ0
2 dθ0
dθ0
dθ0
dθ0
√
2
2 Ia If M sin δ + 2Ia L2 sin 2δ
=
=
part (b): Motor if T > 0, δ > 0. Generator if T < 0, δ < 0.
part (c): For If = 0, there will still be a reluctance torque T = 2Ia2 L2 sin 2δ
and the machine can still operate.
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Problem 4.25
part (a):
v=
f
= 25 m/sec
λ
part (b): The synchronous rotor velocity is 25 m/sec.
part (c): For a slip of 0.045, the rotor velocity will be (1 − 0.045) × 25 =
23.9 m/sec.
Problem 4.26
Irms
=
=
π
2p
2
Bpeak g
√
µ0
3
4
kw Nph
2
−3
1.45 9.3 × 10
π
2×7
2
√
= 218 A
µ0
3
4
0.91 × 280
2
Problem 4.27
part (a): Defining β = 2π/wavelength
Φp = w
Z
π/β
Bpeak cos βxdx =
0
2wBpeak
= 1.48 mWb
β
part (b): Since the rotor is 5 wavelengths long, the armature winding will
link 10 poles of flux with 10 turns per pole. Thus, λpeak = 100Φp = 0.148 Wb.
part (c): ω = βv and thus
Vrms =
ωλpeak
√
= 34.6 V, rms
2
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PROBLEM SOLUTIONS: Chapter 5
Problem 5.1
Basic equations are T ∝ ΦR Ff sin δRF . Since the field current is constant, Ff
is constant, Note also that the resultant flux is proptoortional to the terminal
voltage and inversely to the frequency ΦR ∝ Vt /f . Thus we can write
T ∝
Vt sin δRF
f
P = ωf T ∝ Vt sin δRF
part
part
part
part
(a):
(b):
(c):
(d):
Reduced to 31.1◦
Unchanged
Unchanged
Increased to 39.6◦
Problem 5.2
part (a): The windings are orthogonal and hence the mutual inductance is
zero.
part (b): Since the two windings are orthogonal, the phases are uncoupled
and hence the flux linkage under balanced two-phase operation is unchanged by
currents in the other phase. Thus, the equivalent inductance is simply equal to
the phase self-inductance.
Problem 5.3
1
Lab = − (Laa − Lal ) = −2.25 mH
2
Ls =
3
(Laa − Lal ) + Lal = 7.08 mH
2
Problem 5.4
part (a):
Laf =
√
2 Vl−l,rms
√
= 79.4 mH
3ωIf
part (b): Voltage = (50/60) 15.4 kV = 12.8 kV.
Problem 5.5
part (a): The magnitude of the phase current is equal to
Ia =
40 × 103
√
= 59.1 A
0.85 × 3 460
and its phase angle is − cos−1 0.85 = −31.8◦ . Thus
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57
◦
Iˆa = 59.1e−j31.8
Then
◦
460
Êaf = Va − jXs Iˆa = √ − j4.15 × 59.1e−j31.8 = 136 − 56.8◦ V
3
The field current can be calculated from the magnitude of the generator
voltage
√
2Eaf
If =
= 11.3 A
ωLaf
part (b):
Êaf = 266 − 38.1◦ V; If = 15.3 A
part (c):
Êaf = 395 − 27.8◦ V; If = 20.2 A
Problem 5.6
The solution is similar to that of Problem 5.5 with the exception that the
sychronous impedance jXs is replaced by the impedance Zf + jXs .
part (a):
Êaf = 106 − 66.6◦ V; If = 12.2 A
part (b):
Êaf = 261 − 43.7◦ V; If = 16.3 A
part (c):
Êaf = 416 − 31.2◦ V; If = 22.0 A
Problem 5.7
part (a):
Laf =
√
2 Vl−l,rms
√
= 49.8 mH
3ωIf
part (b):
600 × 103
Iˆa = √
= 151 A
3 2300
Êaf = Va − jXs Iˆa = 1.77 − 41.3◦ V
√
2Eaf
If =
= 160 A
ωLaf
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part (c): See plot below. Minimum current will when the motor is operating
at unity power factor. From the plot, this occurs at a field current of 160 A.
Problem 5.8
part (a):
Zbase =
2
(26 × 103 )2
Vbase
=
= 0.901 Ω
Pbase
750 × 106
Ls =
Xs,pu Zbase
= 4.88 mH
ω
Lal =
Xal,pu Zbase
= 0.43 mH
ω
part (b):
part (c):
Laa =
2
(Ls − Lal ) + Lal = 3.40 mH
3
Problem 5.9
part (a):
SCR =
AFNL
= 0.520
AFSC
part (b):
Zbase = (26 × 103 )2 /(800 × 106 ) = 0.845 Ω
Xs =
1
= 2.19 pu = 1.85 Ω
SCR
part (c):
Xs,u =
AFSC
= 1.92 pu = 1.62 Ω
AFNL, ag
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Problem 5.10
part (a):
SCR =
AFNL
= 1.14
AFSC
part (b):
Zbase = 41602 /(5000 × 103 ) = 3.46 Ω
Xs =
1
= 1.11 pu = 3.86 Ω
SCR
part (c):
Xs,u =
AFSC
= 0.88 pu = 3.05 Ω
AFNL, ag
Problem 5.11
No numerical solution required.
Problem 5.12
part (a): The total power is equal to S = P /pf = 4200 kW/0.87 = 4828 kVA.
The armature current is thus
4828 × 103
(cos−1 0.87) = 670 29.5◦ A
Iˆa = √
3 4160
Defining Zs = Ra + jXs = 0.038 + j4.81 Ω
4160
|Eaf | = |Va − Zs Ia | = | √ − Zs Ia | = 4349 V, line − to − neutral
3
Thus
If = AFNL
4349
√
4160/ 3
= 306 A
part (b): If the machine speed remains constant and the field current is not
reduced, the terminal voltage will increase to the value corresponding to 306 A
of field current on the open-circuit saturation characteristic. Interpolating the
given data shows that this corresponds to a value of around 4850 V line-to-line.
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Problem 5.13
Problem 5.14
At rated
√ power, unity power factor, the armature current will be Ia =
5000 kW/( 3 4160 V) = 694 A. The power dissipated in the armature winding
will then equal Parm = 3 × 6942 × 0.011 = 15.9 kW.
The field current can be found from
4160
|Eaf | = |Va − Zs Ia | = | √ − Zs Ia | = 3194 V, line-to-neutral
3
and thus
If = AFNL
3194
√
4160/ 3
= 319 A
At 125◦ C, the field-winding resistance will be
234.5 + 125
Rf = 0.279
= 0.324 Ω
234.5 + 75
and hence the field-winding power dissipation will be Pfield = If2 Rf = 21.1 kW.
The total loss will then be
Ptot = Pcore + Parm + Pfriction/windage + Pfield = 120 kW
Hence the output power will equal 4880 kW and the efficiency will equal 4880/5000
= 0.976 = 97.6%.
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Problem 5.15
part (a):
part (b): AFNL = 736 A. AFSC = 710 A.
part (c): (i) SCR = 10.4, (ii) Xs = 0.964 per unit and (iii) Xs,u = 1.17 per
unit.
Problem 5.16
For Va = 1.0 per unit, Eaf,max = 2.4 per unit and Xs = 1.6 per unit
Qmax =
Eaf,max − Va
= 0.875 per unit
Xs
Problem 5.17
part (a):
Zbase =
Xs =
2
Vbase
= 5.29 Ω
Pbase
1
= 0.595 per-unit = 3.15 Ω
SCR
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part (b): Using generator convention for current
part (c):
Eaf =
150
= 0.357 per-unit
420
For Va = 1.0 per-unit,
Eaf − Va
Iˆa =
= 1.08 90◦ per-unit = 1.36 90◦ kA
jXs
using Ibase = 1255 A.
part (d): It looks like an inductor.
part (e):
Eaf =
700
= 1.67 per-unit
420
For Va = 1.0 per-unit,
Eaf − Va
= 1.12 − 90◦ per-unit = 1.41 − 90◦ kA
Iˆa =
jXs
In this case, it looks like a capacitor.
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Problem 5.18
Problem 5.19
part (a): It was underexcited, absorbing reactive power.
part (b): It increased.
part (c): The answers are the same.
Problem 5.20
part (a):
Xs =
226
= 0.268 per-unit
842
part (b): P = 0.875 and S = P/0.9 = 0.972, both in per unit. The powerfactor angle is − cos−1 0.9 = −25.8◦ and thus Iˆa = 0.875 − 25.8◦ .
Êaf = Va + jXs Iˆa = 1.15 11.6◦ per-unit
The field current is If = AFNL|Êaf | = 958 A. The rotor angle is 11.6◦ and the
reactive power is
Q = S 2 − P 2 = 4.24 MVA
part (c): Now |Eaf | = 1.0 per unit.
P Xs
−1
δ = sin
|Eaf | = 13.6◦
Va
and thus Êaf = 1.0 13.6◦ .
Êaf − Va
= 0.881 6.79◦
Iˆa =
jXs
Q = Imag[Va Iˆa∗ ] = −0.104 per-unit = −1.04 MVAR
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Problem 5.21
Êaf − Va
Va
Eaf
Iˆa =
=j
+
(sin δ − j cos δ)
jXs
Xs
Xs
The first term is a constant and is the center of the circle. The second term is
a circle of radius Eaf/Xs .
Problem 5.22
part (a):
(i)
(ii) Vt = V∞ = 1.0 per unit. P = 375/650 = 0.577 per unit. Thus
δt = sin−1
P X∞
Vt V∞
= 12.6◦
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and
Vt ejδt − V∞
Iˆa =
= 0.578 3.93◦ per-unit
jX∞
√
Ibase = Pbase /( 3 Vbase ) = 15.64 kA and thus Ia = 9.04 kA.
(iii) The generator terminal current lags the terminal voltage by δt /2 and thus
the power factor is
pf = cos−1 δt /2 = 0.998 lagging
(iv)
|Êaf | = |V∞ + j(X∞ + Xs )Iˆa | = 1.50 per-unit = 36.0 kV,line-to-line
part (b):
(i) Same phasor diagram
(ii) Iˆa = 0.928 6.32◦ per-unit. Ia = 14.5 kA.
(iii) pf = 0.994 lagging
(iv) Eaf = 2.06 per unit = 49.4 kV, line-to-line.
Problem 5.23
part (a):
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part (b):
part (c):
Problem 5.24
part (a): From the solution to Problem 5.15, Xs = 0.964 per unit. Thus,
with V∞ = Eaf = 1.0 per unit
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Pmax =
V∞ Eaf
= 1.04 per-unit
Xs
noindent Hence, full load can be achieved. This will occur at
Xs
−1
δ = sin
= 74.6◦
Eaf Vinfty
part (b): The generator base impedance is 1.31 Ω. Thus, X∞ = 0.14/1.31
= 0.107 per unit. Now
Pmax =
V∞ Eaf
= 1.04 per-unit = 0.934 per-unit = 135 MW
(X∞ + Xs
Problem 5.25
Follwing the calculation steps of Example 5.9, Eaf = 1.35 per unit.
Problem 5.26
Now Xd = .964 per unit and Xq = 0.723 per unit. Thus
part (a):
2
1
V∞
1
V∞ Eaf
P =
sin δ +
−
sin 2δ = 1.037 sin δ + 0.173 sin 2δ
Xd
2
Xq
Xd
An iterative solution with MATLAB shows that maximum power can be achieved
at δ = 53.6◦ .
part (b): Letting XD = Xd + X∞ and XQ = Xq + X∞
1
V2
1
V∞ Eaf
sin δ + ∞
sin 2δ = 0.934 sin δ + 0.136 sin 2δ
−
P =
X
2
XQ
XD
An iterative solution with MATLAB shows that maximum power that can be
achieved is 141 Mw, which occurs at a power angle of 75◦ .
Problem 5.27
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Problem 5.28
Problem 5.29
Problem 5.30
For Eaf = 0,
Pmax =
Vt2
2
1
1
−
Xq
Xq
= 0.21 = 21%
This maximum power occurs for δ = 45◦ .
Id =
Iq =
Vt cos δ
= 0.786 per-unit
Xd
Vt sin δ
= 1.09 per-unit
Xq
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and thus Ia =
Id2 + Iq2 = 1.34 per unit.
S = Vt Ia = 1.34 per-unit
Hence
Q=
Problem 5.30
P =
S 2 − P 2 = 1.32 per-unit
V2
V∞ Eaf
sin δ + ∞
Xd
2
1
1
−
Xq
Xd
sin 2δ
The generator will remain synchronized as long as Pmax > P . An iterative
search with MATLAB can easily be used to find the minimum excitation that
satisfies this condition for any particular loading.
part (a): For P = 0.5, must have Eaf ≥ 0.327 per unit.
part (b): For P = 1.0, must have Eaf ≥ 0.827 per unit.
Problem 5.32
part (a):
part (b): We know that P = 0.95 per unit and that
P =
V∞ Vt
sin δt
Xbus
and that
V̂t − V∞
Iˆa =
jXt
It is necessary to solve these two equations simultaneously for V̂t = Vt δt so
that both the required power is achieved as well as the specified power factor
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angle with respect to the generator terminal voltage. This is most easily done
iteratively with MATLAB. Once this is done, it is straightforward to calculate
Vt = 1.02 per-unit;
Eaf = 2.05 per-unit;
δ = 46.6◦
Problem 5.33
part (a): Define XD = Xd + Xbus and XQ = Xq + Xbus .
(i)
Eaf,min = Vbus − XD = 0.04 per-unit
Eaf,max = Vbus + XD = 1.96 per-unit
(ii)
part (b):
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part (c):
Problem 5.34
f=
3000 × 6
n × poles
=
= 150 Hz
120
120
Problem 5.35
part (a): Because the load is resistive, we know that
4500
P
=√
= 13.5 A
3Va
3192
√
part (b): We know that Eaf = 208/ 3 = 120 V. Solving
Eaf = Va2 + (Xs Ia )2
Ia =
for Xs gives
2 −V2
Eaf
a
= 3.41 Ω
Xs =
Ia
part (c): The easiest way to solve this is to use MATLAB to iterate to
find the required load resistance. If this is done, the solution is Va = 108 V
(line-to-neutral) = 187 V (line-to-line).
Problem 5.36
Iˆa =
Ea
ωKa
=
Ra + Rb + jωLa
Ra + Rb + jωLa
Thus
ωKa
|Iˆa | = =
(Ra + Rb )2 + (ωLa)2
Ka
a +Rb
La 1 + RωL
a
Clearly, Ia will remain constant with speed as long as the speed is sufficient
to insure that ω >> (Ra + Rb )/La
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PROBLEM SOLUTIONS: Chapter 6
Problem 6.1
part (a): Synchronous speed is 1800 r/min. Therefore,
s=
1800 − 1755
= 0.025 = 2.5%
1800
part (b): Rotor currents are at slip frequency, fr = s60 = 1.5 Hz.
part (c): The stator flux wave rotates at synchronous speed with respect to
the stator (1800 r/min). It rotates at slip speed ahead of the rotor (s1800 = 45
r/min).
part (d): The rotor flux wave is synchronous with that of the stator. Thus it
rotatesat synchronous speed with respect to the stator (1800 r/min). It rotates
at slip speed ahead of the rotor (s1800 = 45 r/min).
Problem 6.2
part (a): The slip is equal to s = 0.89/50 = 0.0178. The synchronous speed
for a 6-pole, 50-Hz motor is 1000 r/min. Thus the rotor speed is
n = (1 − s)1000 = 982 r/min
part (b): The slip of a 4-pole, 60-Hz motor operating at 1740 r/min is
s=
1800 − 1740
= 0.0333 = 3.33%
1800
The rotor currents will therefore be at slip frequency fr = 60 ∗ 0.0333 = 2 Hz.
Problem 6.3
part (a): The synchronous speed is clearly 1200 r/min. Therefore the motor
has 6 poles.
part (b): The full-load slip is
s=
Hz.
1200 − 1112
= 0.0733 = 7.33%
1200
part (c): The rotor currents will be at slip frequency fr = 60 ∗ 0.0733 = 4.4
part (d): The rotor field rotates at synchronous speed. Thus it rotates at
1200 r/min with respect to the stator and (1200-1112) = 88 r/min with respect
to the rotor.
Problem 6.4
part (a): The wavelenth of the fundamental flux wave is equal to the span
of two poles or λ = 4.5/12 = 0.375 m. The period of the applied excitation is
T = 1/75 = 13.33 msec. Thus the synchronous speed is
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vs =
λ
= 28.1 m/sec = 101.3 km/hr
T
part (b): Because this is an induction machine, the car in this case) will
never reach synchronous speed.
part (c):
s=
101.3 − 95
= 0.0622 = 6.22%
101.3
The induced track currents will be a slip frequency, f = s75 = 4.66 Hz.
part (d): For a slip of 6.22% and a car velocity of 75 km/hr, the synchronous
velocity must be
vs =
75
= 80.0 km/hr
1−s
Thus the electrical frequency must be
75
f = 80
= 59.2 Hz
101.3
and the track currents will be at a frequency of sf = 3.68 Hz.
Problem 6.5
part (a): For operation at constant slip frequency fr , the applied electrical
frequency fe is related to the motor speed in r/min n as
poles
fe = n
+ fr
120
and thus, since the slip frequency fr remains constant, we see that the applied
electrical frequency will vary linearly with the desired speed.
Neglecting the voltage drop across the armature leakage inductance and
winding resistance, the magnitude of the armature voltage is proportional to the
air-gap flux density and the frequency. Hence the magnitude of the armature
voltage must vary linearly with electrical frequency and hence the desired speed.
part (b): The electrical frequency of the rotor currents is equal to the slip
frequency and hence will remain constant. Since the rotor will be operating in
a constant flux which varies at a constant frequency, the magnitude of the rotor
currents will be unchanged.
part (c): Because the rotor air-gap flux density and the rotor currents are
unchanged, the torque will remain constant.
Problem 6.6
part (a): Since the torque is proportional to the square of the voltage, the
torque-speed characteristic will simply be reduced by a factor of 4.
part (b): Neglecting the effects of stator resistance and leakage reactance,
having both the voltage and frequency maintains constant air-gap flux. Hence
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the torque-speed characteristic looks the same as the original but the synchronous speed is halved.
Problem 6.7
part (a): Four poles.
part (b): Counterclockwise
part (c): 1800 r/min
part (d): Four poles
part (e): No. There will be dc flux linking the induction-motor rotor windings but there will be no resultant voltage at the slip rings.
Problem 6.8
part (a): 1500 r/min
part (b): The induction motor rotor is rotating at 1500 r/min in the clockwise direction. Its stator flux wave is rotating at 3000× (2/poles) = 1000 r/min
in the counterclockwise direction. Thus, the rotor sees a flux wave rotating at
2500 r/min. Noting that a flux wave rotating at 1000 r/min would produce
50-Hz voltages at the slip rings, we see that in this case the rotor frequency will
be fr = 50 × (2500/1000) = 125 Hz.
part (c): Now the stator flux wave will rotate at 1000 r/min in the clockwise
direction and the rotor will see a flux wave rotating at 500 r/min. The induced
voltage will therefore be at a frequency of 25 Hz.
Problem 6.9
part (a): R1 will decrease by a factor of 1.04 to 0.212 Ω.
part (b): Xm will increase by a factor of 1/.85 to 53.8 Ω.
part (c): R2 will decrease by a factor of 3.5/5.8 to 0.125 Ω.
part (d): All values will decrease by a factor of 3.
Problem 6.10
This problem can be solved by direct substitution into the equations in
chapter 6, which can in-turn be easily implemented in MATLAB. The following
table of results was obtained from a MATLAB script which implemented the
equivalent-circuit equations assuming the core-loss resistance Rc is in parallel
with the magnetizing reactance. Rc was calculated as
Rc =
slip [%]
speed [r/min]
Tout [N·m]
Pout [kW]
Pin [kW]
power factor
efficiency [%]
Problem 6.11
part (a): 1741 r/min
4602
= 962 Ω
220
1.0
1782
8.5
8.5
45.8
0.81
93.3
2.0
1764
16.5
16.5
89.6
0.87
94.4
3.0
1746
23.4
23.4
128
0.85
93.8
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part (b): 1799 r/min
part (c):
part (d):
Problem 6.12
For a speed of 1725 r/min, Pout = 426, kW, Pin = 457 kW, pf = 0.751
lagging and η = 93.3 %.
Problem 6.13
It is necessary to find find the value of R2 . This can be easily done by writing
a MATLAB script to iteratively find that value of R2 which full-load internal
torque at a slip of 3.5%. The result is R2 = 0.0953 Ω. Once this is done, the
same MATLAB script can be used to sustitute the machine parameters into
the equations of chapter 6 to find Tmax = 177 N·m at a slip of 18.2% and
Tstart = 71.6 N·m.
Problem 6.14
This problem is readily solved once the value of R2 has been found as discussed in the solution to Problem 6.13. The impedance of the feeder must be
added in series with the armature resistance R1 and leakage reactance X1 . A
MATLAB script can then be written to find the desired operating point. The
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76
result is that the motor achieves rated output at a slip of 3.67% and a terminal
voltage of 221.6 V, line-to-line.
Problem 6.15
part (a): For R1 = 0, R1,eq = 0 and thus from Eq. 6.34
R2
= (X1,eq + X2 )
smaxT
From Eq. 6.36,
Tmax =
2
0.5nph V1,eq
ωs (X1,eq + X2 )
and from Eq.6.33 with s = 1
Tstart =
Noting that
2
nph V1,eq
R2
ωs [R22 + (X1,eq + X2 )2 ]
Tmax
2.20
=
= 1.63
Tstart
1.35
we can take the ratio of the above equations
Tmax
= 1.63 =
Tstart
R22
2
(X1,eq
2
+
+ X2 )
=
R2 (X1,eq + X2 )
R2
X1,eq +X2
2
+1
R2
X1,eq +X2
From Eq.6.34, with Req,1 = 0, smaxT = R2 /(X1,eq + X2 ). Hence
0.5(s2maxT + 1)
= 1.63
smaxT
which can be solved to give smaxT = 0.343 = 34.3%.
part (b): From Eq. 6.33 with Req,1 = 0 and with s = srated ,
Trated =
2
nph V1,eq
(R2 /srated )
2
ωs [(R2 /srated) + (X1,eq + X2 )2 ]
and thus
Tmax
= 2.1
Trated
=
0.5[(R2 /srated )2 + (Xeq,1 + X2 )2 ]
(R2 /srated )(Xeq,1 + X2 )
=
0.5[1 + (smaxT /srated )2 ]
smaxT /srated
This can be solved to give
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77
srated = 0.240smaxT = 0.0824 = 8.24%
part (c):
Iˆ2,start =
Iˆ2,rated =
V̂1,eq
V̂1,eq
=
R2 + j(Xeq,1 + X2 )
(Xeq,1 + X2 )(smaxT + j)
V̂1,eq
V̂1,eq
=
R2 /srated + j(Xeq,1 + X2 )
(Xeq,1 + X2 )(smaxT /srated + j)
Thus
|Iˆ2,start |
|4.16 + j|
|smaxT /srated + j|
=
= 4.05 = 405%
=
ˆ
|smaxT + j|
|.343 + j|
|I2,rated |
Problem 6.16
Given Tmax = 2.3Tfl , smaxT = 0.55 and sfl = 0.087, start by taking the ratio
of Eqs. 6.36 and 6.33
Tmax
0.5[(R1,eq + R2 /sfl )2 + (X1,eq + X2 )2 ]
=
Tfl
2
R1,eq + R1,eq
+ (X1,eq + X2 )2 (R2 /sfl )
Substituting Eq. 6.34 gives
Tmax
=
Tfl
0.5sfl
2
sfl
R1,eq
R2
R1,eq
R2
+
+
1
sfl
2
+
1
smaxT
1
smaxT
2 Substituting given values and solving gives
Req,1
= 1.315
R2
From Eq. 6.33 we can write
 2 
2 Req,1
Xeq,1 +X2
1
+
+
R2
sfl
R2
Tstart


= sfl  2 2 
Tfl
Req,1
X
+X
eq,1
2
1
+
R2 + smaxT
R2
From Eq. 6.34,
X1,eq + X2
R2
and thus we can solve for
2
=
1
smaxT
2
−
R1,eq
R2
2
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Tstart = 1.26Tfl
Problem 6.17
part (a): Using MATLAB to solve the equivalent-circuit equations, from
the equivalent-circuit at a slip of 3.35%, the power applied to the shaft can be
calculated to be 503.2 kW. Thus the rotational loss is 3.2 kW. Similarly, the
input power to the equivalent circuit is 528.0 kW. Based upon an efficiency of
94%, the actual motor input power is 500 kW/0.94 = 531.9 kW. Thus, the core
losses are equal to 531.9 - 528.0 = 3.9 kW.
part (b): The equivalent circuit is solved in the normal fashion. For ease of
calculation, the core loss can be accounted for by a resistor connected at the
equivalent-circuit terminals (based upon the results of part (a), this corresponds
to a resistance of 1.47 kΩ. The shaft input power is equal to the negative of
the shaft power calculated from the equivalent circuit plus the rotational loss
power. The electrical output power is equal to the negative of the input power
to the equivalent circuit. The result is (using MATLAB):
(i) Generator output power = 512 kW
(ii) efficiency = 91.6%
(iii) power factor = 0.89
part (c): Basically the same calculation as part (b). The impedance of the
feeder must be added to armature impedance of the induction motor. The result
is (using MATLAB):
(i) Power supplied to the bus = 498 kW
(ii) Generator output power = 508 kW
Problem 6.18
Problem 6.19
2
2
part (a): Given I2,maxT
R2 = 9.0I2,fl
R2 . Thus I2,maxT = 3.0I2,fl . Ignoring
R1 , R1,eq = 0 and we can write
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Iˆ2 =
V̂eq
R2 /s + j(Xeq + X2 )
and thus
Iˆ2,fl
j(Xeq + X2 ) + R2 /smaxT
=
ˆ
j(Xeq + X2 ) + R2 /sfl
I2,maxT
Substitution from Eq. 6.34
(X1,eq + X2 ) =
R2
smaxT
gives
Iˆ2,fl
Iˆ2,maxT
j+1
j + smaxT /sfl
=
and thus
I2,fl
I2,maxT
=
√
2
|j + 1|
=
|j + smaxT /sfl |
1 + (smaxT /sfl )2
Finally, we can solve for smaxT
smaxT = 4.12sfl = 0.0948 = 9.48%
part (b): Taking the ratio of Eqs. 6.36 and 6.33 with R1,eq = 0 and substitution of Eq. 6.34 gives
0.5[1 + (smaxT /sfl )2 ]
0.5[(R2 /sfl )2 + (X1,eq + X2 )2 ]
Tmax
=
= 2.18
=
Tfl
(X1,eq + X2 )(R2 /sfl )
(smaxT /sfl )
In other words, Tmax = 2.18 per unit.
part (c): In a similar fashion, one can show that
1 + (smaxT /sfl )2
Tstart
= sfl
= 0.41
Tfl
1 + s2maxT
In other words, Tstart = 0.41 per unit.
Problem 6.20
part (a): T ∝ I22 R2 /s. Thus
Tstart
= sfl
Tfl
I2,start
I2,fl
2
= 1.32
and thus Tstart = 1.32 per unit.
part (b): As in the solution to Problem 6.15, neglecting the effects of R1
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|smaxT /sfl + j|
|Iˆ2,start |
=
|smaxT + j|
|Iˆ2,rated |
This can be solved for smaxT
smaxT = sfl
1 − (I2,start /Ifl )2
= 0.224 = 22.4%
(sfl I2,start /Ifl )2 − 1
Again, from the solution to Problem 6.15,
Tmax
0.5[1 + (smaxT /sfl )2 ]
=
= 3.12
Trated
smaxT /sfl
and thus Tmax = 3.12 per unit.
Problem 6.21
part (a): Solving the equations of chapter 6, with s = 1 for starting, with
MATLAB yields
Istart = 233 A
Tstart = 79.1 N·m
part (b): (i) When the motor is connected in Y, the equivalent-circuit parameters will be three times those of the normal ∆ connection. Thus
R1 = 0.135 Ω
R2 = 0.162 Ω
X1 = 0.87 Ω
X2 = 0.84 Ω
Xm = 28.8 Ω
(ii)
Istart = 77.6 A
Tstart = 26.3 N·m
Problem 6.22
part (a):
2
Prot = Pnl − 3Inl
R1 = 2672 W
part (b): The parameters are calculated following exactly the procedure
found in Example 6.5. The results are:
R1 = 1.11 Ω
X1 = 3.90 Ω
R2 = 1.34 Ω
X2 = 3.90 Ω
Xm = 168 Ω
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part (c): Solving the equations of chapter 6 using the equivalent-circuit
parameters of part (b)
Ia = 29.1 A
Pin = 106 kW
power factor = 0.91 lagging
Pout = 100 kW
efficiency = 94.5%
Problem 6.23
Because this is a blocked-rotor test, one can ignore the magnetizing reactance
Xm . As a result, the motor input impedance can be approximated as
Zin ≈ R1 + R2 + j(X1 + X2 )
R2 can be calculated from the blocked-rotor power and current
R2 =
Bbl
2 − R1
3Ibl
which gives
Motor 1: R2 = 0.174 Ω
Motor 2: R2 = 0.626 Ω
2
The motor starting torque is proportional to Ibl
R2 and thus the torque ratio
is given by
2
(R2 )motor2
(I2 )motor2
Tmotor2
(I22 )motor2 (R2 )motor2
= 2
=
Tmotor1
(I2 )motor1 (R2 )motor1
(R2 )motor1
(I22 )motor1
Thus, for the same currents, the torque will be simply proportional to the
resistance ratio and hence
Tmotor2
= 0.278
Tmotor1
From the given data, we see that for the same voltage, the current ratio will
be (I2 )motor2 /(I2 )motor1 = 99.4/74.7 = 1.39 and hence
Tmotor2
= 0.492
Tmotor1
Problem 6.24
Rotational loss = 3120 W
R1 = 0.318 Ω R2 = 0.605 Ω
X1 = 2.28 Ω X2 = 3.42 Ω Xm = 63.4 Ω
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Problem 6.25
Neglecting R1 and hence Req,1 gives from Eq. 6.35
smaxT =
R2
X1,eq + X2
and from Eq. 6.36
Tmax =
2
2
0.5nph V1,eq
0.5nphV1,eq
smaxT
=
ωs (X1,eq + X2 )
ωs R2
If the frequency is reduced from 60 to 50 Hz, X1,eq + X2 will drop by a
factor of 5/6 and hence smaxT will increase by a factor of 6/5 to smaxT = 18%,
corresponding to a speed of 1000(1 − 0.18) = 820 r/min.
Tmax will increase as
(190/230)2(6/5)
(Tmax )50
= 0.983
=
(Tmax )60
5/6
or (Tmax )50 = 283%
Problem 6.26
smaxT ∝ R2 . Therefore
R2 =
1.1
= 2.07 Ω
[(smaxT )Rext =1.1 /(smaxT )Rext =0 ] − 1
Problem 6.27
part (a): From the solution to Problem 6.15
0.5[1 + (smaxT /sfl )2 ]
Tmax
=
Tfl
smaxT /sfl
Given that Tmax /Tfl = 2.25 and smaxT = 0.16, this can be solved for sfl =
0.0375 = 3.75%.
part (b): The rotor rotor power dissipation at rated load is given by
sfl
= 2.9 kW
Protor = Prated
1 − sfl
part (c): From the solution to Problem 6.19
1 + (smaxT /sfl )2
Tstart
= sfl
= 0.70
Tfl
1 + s2maxT
Rated torque is equal to 75 kW/ωm,fl where ωm,fl = 60π(1−sfl) = 181.4 rad/sec.
Thus Trated = 413 N·m and Tstart = 0.70 per unit = 290 N·m.
part (d): If the rotor resistance is doubled, the motor impedance will be the
same if the slip is also doubled. Thus, the slip will be equal to s = 2sfl = 7.50%.
part (e): The torque will equal to full-load torque. Thus T = 413 N·m.
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Problem 6.28
Problem 6.29
part (a):
Protor = Prated
sfl
1 − sfl
= 3.63 kW
part (b): From the solution to Problem 6.15
Tmax
0.5[1 + (smaxT /sfl )2 ]
=
Tfl
smaxT /sfl
Given that Tmax /Tfl = 3.10 and sfl = (1200 − 1158)/1200 = 0035, this can be
solved for smaxT = 0.211 = 21.1%. This corresponds to a speed of 1200(1 −
0.211) = 947 r/min.
part (c): Sufficient resistance must be inserted to increase smaxT from 0.211
to 1.0. Thus R2,tot = 0.17/.211 = 0.806 Ω and hence the added resistance must
be Rext = 0.806 − 0.211 = 0.635 Ω.
part (d): The applied voltage must be reduced by a factor of 5/6 to 383 V,
line-to-line.
part (e): From Eq. 6.35, smaxT = R2 /(X1,eq + X2 ). If the frequency decreases by a factor of 5/6, the reactances will also decrease by a factor of 5/6 and
hence smaxT will increase by a factor of 6/5 to 0.042. Hence, the corresponding
speed will be 1000(1 − 0.042) = 958 r/min.
Problem 6.30
If the impedance of the motor at starting is made equal to that of the motor
at a slip of 5.6% the starting current will be equal to 200% of its rated value.
This can be done by increasing the rotor resistance for 90/2 = 45 mΩ to
R2,tot =
0.045
= 804 mΩ
0.056
and hence the requierd added resistance will be Rext = 804 − 45 = 759 mΩ.
The starting torque under this condition will be 190% of the full-load torque.
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Problem 6.31
The synchronous speed of this motor is 3600/8 = 450 r/min (47.12 rad/sec).
Thus its full-load speed is 450(1 − 0.041) = 431.6 r/min. The corresponding
torque will be (250 × 103 )[47.12(1 − 0.041)] = 5.53 × 103 N·m. At a speed of
400 r/min, the torque will be 5.53 × 103 (400/431.6)2 = 4.75 × 103 N·m.
With no external resistance, the slope of the torque-speed characteristic is
thus 5.53 × 103 /431.6 = 12.81. The slope of the desired torque-speed characteristic is 4.75 × 103 /400 = 11.88. Since the initial slope of the torque-speed
characteristic is inversely proportional to the rotor resistance, the total rotor
resistance must be
12.81
Rtot =
24.5 = 26.4 mΩ
11.88
Therefore the required added resistance is 26.4 − 24.5 = 1.9 mΩ.
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PROBLEM SOLUTIONS: Chapter 7
Problem 7.1
part (a): ωm ∝ Va .
part (b): ωm ∝ I1f
part (c): ωm will be constant.
Problem 7.2
part (a): For constant terminal voltage, the product nIf (where n is the
motor speed) is constant. Hence, since If ∝ 1/Rf
Rf
Rf + 5
=
1180
1250
and hence Rf = 84.2 Ω.
part (b): 1380 r/min
Problem 7.3
Check this
part (a): ωm halved; Ia constant
part (b): ωm halved; Ia doubled
part (c): ωm halved; Ia halved
part (d): ωm constant; Ia doubled
part (e): ωm halved; Ia reduced by a factor of 4.
Problem 7.4
part (a): Rated armature current = 25 kW/250-V = 100 A.
part (b): At 1200 r/min, Ea can be determined directly from the magnetization curve of Fig. 7.27. The armature voltage can be calculated as
Va = Ea + Ia Ra
and the power output as Pout = Va Ia . With Ia = 100 A
If [A]
1.0
2.0
2.5
Ea [V]
150
240
270
Va [V]
164
254
284
Pout [kW]
16.4
25.4
28.4
part (c): The solution proceeds as in part (b) but with the generated voltage
equal to 900/1200 = 0.75 times that of part (b)
If [A]
1.0
2.0
2.5
Ea [V]
112
180
202
Va [V]
126
194
216
Pout [kW]
12.6
19.4
21.6
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Problem 7.5
part (a):
part (b):
(i)
(ii)
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Problem 7.6
part (a):
Pshaft = Ea
Va − Ea
Ra
and thus
Va2 − 4Pshaft Ra
Ea =
2
The motor speed n can then be found from
Ea
n = 1200
r/min
1.67 × 1200
Va +
Here is the desired plot, produced by MATLAB
part (b): The solution for Ea proceeds as in part (a). With the speed
constant at 1200 r/min (and hence constant ωm ), solve for If as
If =
Ea
Kf
where Kf = 150D V/A. Here is the desired plot, produced by MATLAB.
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Problem 7.7
The solution is similar to that of Problem 7.6 with the exception that the
assumed straight-line magnetization characteristic is replaced by the non-linear
characteristic of Fig. 7.27. MATLAB, with the ’spline()’ function used to
represent the non-linear characteristic of Fig. 7.27, then produces the following
plots.
part (a):
part (b):
Problem 7.8
part (a): From the load data, the generated voltage is equal to 254 + 62.7 ×
0.175 = 265 A. From the magnetizing curve (using the ’spline()’ function of
MATLAB), the corresponding field current is 1.54 A. Hence the demagnetizing
effect of this armature current is equal to (1.95 − 1.54)500 = 204 A-turns/pole.
part (b): At the desired operating point, the generator output power will be
250 V × 61.5 A = 15.4 kW. Therefore, the motor speed will be
15.4
= 1139 r/min
n = 1195 − 55
15
Because the machine terminal voltage at no load must equal 230 V, from
the magnetizing curve we see that the shunt field under this operating condition
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must equal 1.05 A and hence the shunt field resistance must be 219 Ω. Hence,
under this loading condition, with a terminal voltage of 250 V, the armature
voltage will be 250 + 61.5 × 0.065 = 250.8 V, the shunt field current will equal
250.8/219 = 1.15 A and thus the armature current will equal 61.5 + 1.15 =
62.7 A.
The generated voltage can now be calculated to be 250.8 + 62.7(0.175) =
286 V. The corresponding voltage on the 1195 r/min mag curve will be Ea =
286(1195/1139) = 285 V and hence the required net field ampere-turns is (using
the MATLAB ‘spline()’ function) 1042 A-turns. The shunt-field ampere-turns
is 1.15 × 500 = 575 A-turns, the demagnetizing armature amp-turns are 204 Aturns and hence the required series turns are
Ns =
1042 − (575 − 204)
= 10.6 ≈ 11 turns
61.5
Problem 7.9
From the given data, the generated voltage at Ia = 90A and n(90) =
975 r/min is
Ea (90) = Va − Ia (Ra + Rs ) = 230 − 90(0.11 + 0.08) = 212.9 V
Similarly, the generated voltage at Ia = 30 A is
Ea (30) = 230 − 30(0.11 + 0.08) = 224.3 V
Since Ea ∝ nΦ
Ea (30)
=
Ea (90)
n(30)
n(90)
Φ(30)
Φ(90)
Making use of the fact that Φ(30)/Φ(90) = 0.48, we can solve for n(30)
Ea (30)
Φ(90)
n(30) = n(90)
= 2140 r/min
Ea (90)
Φ(30)
Problem 7.10
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Problem 7.11
part (a): For constant field current, and hence constant field flux, constant
torque corresponds to constant armature current. Thus for speeds up to 1200
r/min, the armature current will remain constant. For speeds above 1200 r/min,
ignoring the voltage drop across the armature resistance, the motor speed will
be inversely proportional to the field current (and hence the field flux). Thus the
armature current will increase linearly with speed from its value at 1200 r/min.
Note that as a practical matter, the armature current should be limited to its
rated value, but that limitation is not considered in the plot below.
part (b): In this case, the torque will remain constant as the speed is increased to 1200 r/min. However, as the field flux drops to increase the speed
above 1200 r/min, it is not possible to increase the armature current as the field
flux is reduced to increase the speed above 1200 r/min and hence the torque
track the field flux and will decrease in inverse proportion to the change in speed
above 1200 r/min.
Problem 7.12
part (a): With constant terminal voltage and speed variation obtained by
field current control, the field current (and hence the field flux) will be inversely
proportional to the speed. Constant power operation (motor A) will then require
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constant armature current. Constant torque (motor B) will require that the
armature current variation be proportional to the motor speed. Thus
motor A: Ia = 125 A
motor B: Ia = 125(500/1800) = 34.7 A
part (b):
motor A: Ia = 125 A
motor B: Ia = 125(1800/125) = 450 A
part (c): Under armature voltage control and with constant field current,
the speed will be proportional to the armature voltage. The generated voltage
will be proportional to the speed. Constant-power operation (motor A) will require aramture current that increases inversely with speed while constant torque
operation (motor B) will require constant armature current.
For the conditions of part (a):
motor A: Ia = 125(1800/125) = 450 A
motor B: Ia = 125 A
For the conditions of part (b):
motor A: Ia = 125(500/1800) = 34.7 A
motor B: Ia = 125 A
Problem 7.13
ωm =
Va − Ia Ra
Ea
=
K a Φd
K a Φd
Ia =
T
K a Φd
Thus
1
ωm =
K a Φd
T Ra
Va −
K a Φd
The desired result can be obtained by taking the derivative of ωm with Φd
dωm
dΦd
=
=
=
2T Ra
1
− Va
Ka Φ2d Ka Φd
1
(2Ia Ra − Va )
Ka Φ2d
1
(Va − 2Ea )
Ka Φ2d
From this we see that for Ea > 0.5Va , dωa /dΦd < 0 and for Ea < 0.5Va ,
dωa /dΦd > 0. Q.E.D.
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Problem 7.14
part (a):
Synchronous machine:
30 × 103
Ia,ac = √
= 37.7 A
3 460
√
Eaf = |Va,ac + jXs Ia,ac | = |460/ 3 + j5.13 × 37.7| = 328.4 V, l − n
DC machine:
P = Ea Ia,dc = 30 kW
Ea = Va,dc − Ia,dc Ra
Thus,
Ea2 =
Va,dc +
2
Va,dc
− 4P Ra
2
= 226 V
part (b): Increase the dc-motor field excitation until Ea = Va,dc = 230 V,
in which case the dc motor input current will equal zero and it will produce no
shaft power. The ac machine will operate at a power angle of zero and hence
its terminal current will be
Ia,ac =
Eaf − V a, ac
= 12.2 A
Xs
part (c): If one further increases the dc-machine field excitation the dc
machine will act as a generator. In this case, defining the dc generator current
as positive out of the machine,
P = Ea Ia,dc = 30 kW
Ea = Va,dc + Ia,dc Ra
Thus,
Ea2 =
Va,dc +
2
Va,dc
+ 4P Ra
2
= 226 V
and
Ia,dc =
Ea − Va,dc
= 128 A
Ra
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The ac machine will now be operating as a motor. The armature current
will be the negative of that of part (a) and hence the power factor will be unity.
Its magnitude will be 37.7 A.
Problem 7.15
First find the demagnetizing mmf. At rated load,
Ea = Va − Ia Rtot = 600 − 250 × 0.125 = 568.8 V
Using the MATLAB ‘spline’ function, the corresponding field current on the 400
r/min magnetizing curve is
If = 232 A
Thus, the demagnetizing mmf at a current of 250 A is equal to 250 − 232 =
18 A and in general, the effective series-field current will be equal to
2
Ia
Is,eff = Ia − 18
250
For a starting current of 460 A, the effective series field current will thus equal
399 A. Using the MATLAB ‘spline()’ function, this corresponds to a generated
voltage of 474 V from the 400 r/min magnetization curve. The corresponding
torque (which will be the same as the starting torque due to the same flux and
armature current) can then be calculated as
T =
474 × 560
Ea Ia
= 5200 N · m
=
ωm
400(π/30)
Problem 7.16
At no load, Ea,nl = 230 − 6.35 × 0.11 = 229.3 V. At full load, Ea,fl =
230 − 115 ∗ 0.11 = 217.4 V. But, Ea ∝ nΦ, thus
Φnl
217.4
Ea,fl
1
nfl = nnl
= 2150
= 2168 r/min
Ea,nl
Φfl
229.3
0.94
Problem 7.17
The motor power is given by P = Ea Ia , where
Ea = Ka Φd ωm
and where, from Eq. 7.3
Ka =
4 × 666
poles Ca
=
= 212
2πm
2π × 2
Thus, for Φd = 0.01, Ea = Ka Φd ωm = 2.12ωm.
Ia =
Vt − Ea
Ra
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Using MATLAB and its ‘spline()’ function to represent the fan characteristics, an iterative routine can be written to solve for the operating point (the
intersection of the motor and fan characteristics). The result is that the motor
will operate at a speed of 999 r/min and an output power of 8.39 kW.
Problem 7.18
part (a): Assuming negligible voltage drop across the armature resistance
at no load, the field current can be found from the 1300 r/min magnetization
curve by setting Ea = 230 V. This can be most easily done using the MATLAB
‘spline()’ function. The result is If = 1.67 A. This corresponds to Nf If =
2500 a·turns of mmf.
part (b): At rated load, Ea = Va − Ia Ra = 230 − 46.5 × 0.17 = 222.1 V. From
the no-load, 1300 r/min magnetization curve, the corresponding field current
is 1.50 A (again obtained using the MATLAB ‘spline()’ function). Thus, the
effective armature reaction is
Armature reaction = (1.67 − 1.5) A × 1500 turns/pole
= 251 A · turns/pole
part (c): With the series field winding, Rtot = Ra + Rs = 0.208 Ω. Thus,
under this condition, Ea = Va −Ia Ra = 220.3. This corresponds to a 1300 r/min
generated voltage of 236.7 V and a corresponding field current (determined
from the magnetization curve using the MATLAB ‘spline()’ function) of 1.84 A,
corresponding to a total of 2755 A·turns. Thus, the required series field turns
will be
Ns =
2755 − (2500 − 251)
= 10.8
46.5
or, rounding to the nearest integer, Ns = 11 turns/pole.
part (d): Now the effective field current will be
Ieff =
2500 − 251 + 20 × 46.5
= 2.12 A
1500
From the 1300 r/min magnetization curve, Ea = 246.1 V while the actual
Ea = Va − Rtot Ia = 220.3 V. Hence the new speed is
220.3
n = 1300
= 1164 r/min
246.1
Problem 7.19
part (a): At full load, 1185 r/min, with a field current of 0.554 A
Ea = Va − Ia Rtot = 221.4 V
where Rtot = 0.21 + 0.035 = 0.245 Ω.
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An 1825 r/min magnetization curve can be obtained by multiplying 230 V
by the ratio of 1185 r/min divided by the given speed for each of the points in
the data table. A MATLAB ‘spline()’ fit can then be used to determine that this
generated voltage corresponds to a field-current of 0.527 A . Thus, the armature
reaction is (0.554 − 0.527)2000 = 53.4 A·turns/pole.
part (b): The full-load torque is
221.4 × 34.2
Ea Ia
= 62.8 N · m
=
ωm
1185(π/30)
T =
part (c): The maximum field current is 230/310 = 0.742 Ω. The effective
field current under this condition will therefore be
Ieff =
2000 × 0.742 − 160
= 0.662 A
2000
From the 1185 r/min magnetization curve found in part (b), this corresponds
to a generated voltage of 245 V. Thus, the corresponding torque will be
T =
Ea Ia
245 × 65
= 128 N · m
=
ωm
1185(π/30)
part (d): With the addition of 0.05 Ω, the total resistance in the armature
circuit will now be Rtot = 0.295 Ω. The required generated voltage will thus be
Ea = Va − Ia Rtot = 219.6 V
This corresponds to 219.6(1185/1050) = 247.8 V on the 1185 r/min magnetization curve and a corresponding effective field current of 0.701 A.
As can be seen from the data table, a no-load speed of 1200 r/min corresponds to a field current of 0.554 A. Thus the series-field A·turns must make up
for the difference between that required and the actual field current as reduced
by armature reaction.
Ns
=
=
Nf (If,eff − If ) + Armature reaction
Ia
2000(0.701 − 0.554) + 53.4
= 9.8 turns
35.2
Problem 7.20
part (a): From the demagnetization curve, we see that the shunt field current
is 0.55 A since the no-load generated voltage must equal 230 V. The full-load
generated voltage is
Ea = Va − Ia Ra = 219.4 V
and the corresponding field current (from the demagnetization curve obtained
using the MATLAB ‘spline()’ function) is 0.487 A. Thus the demagnetization
is equal to 2000(0.55 − 0.487) = 127 A·turns.
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part (b): The total effective armature resistance is now Rtot = 0.15+0.028 =
0.178 Ω. Thus, the full-load generated voltage will be
Ea = Va − Ia Rtot = 217.4 V
The net effective field current is now equal to 0.487+70.8(4/2000) = 0.628 A.
The corresponding voltage at 1750 r/min (found from the magnetization curve
using the MATLAB ‘spline()’ function) is 242.7 V and hence the full-load speed
is
217.4
n = 1750
= 1567 r/min
242.7
part (c): The effective field current under this condition will be
Ieff = 0.55 + 125(4/2000) − 230/2000 = 0.685 A
From the 1750 r/min magnetization curve (using the MATLAB ‘spline()’ function), this corresponds to a generated voltage of 249 V. Thus, the corresponding
torque will be
T =
249 × 125
Ea Ia
=
= 170 N · m
ωm
1750(π/30)
Problem 7.21
part (a): For a constant torque load, changing the armature resistance will
not change the armature current and hence Ia = 60 A.
part(b):
Ea = Va − Ra Ia
Thus, without the added 1.0Ω resistor, Ea = 216 V and with it Ea = 156 V.
Thus,
Speed ratio =
Problem 7.22
parts (a) and (b):
156
= 0.72
216
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Operation in the fourth quadrant means that the motor torque is positive while
the speed is negative. In this case the motor is acting as a generator and
absorbing energy from the lowering load, which would otherwise accelerate due
to the effects of gravity.
part (c): -473 r/min
Problem 7.23
part (a): At rated load, Ea = 230 − 122 times0.064 = 222 V. Thus, ratedload speed is
222
n = 1150
= 1133 r/min
230
part (b): The maximum value of the starting resistance will be required at
starting.
230
= 2 × 122 = 244
Ra + Rmax
and thus Rmax = 0.878 Ω.
part (c): For each value of Rtot = Ra + Rext , the armature current will reach
its rated value when the motor reaches a speed such that
Ea = 230 − 122Rtot,old
At this point Rtot will be reduced such that the armature current again reaches
122 A. Based upon this alogrithm, the external resistance can be controlled as
shown in the following table:
Step number
1
2
3
4
5
Rext [Ω]
0.878
0.407
0.170
0.051
0
Ea,min [V]
0
115
173
202
216
nmin [r/min] [V]
0
587
882
1030
1101
Ea,max [V]
115
173
202
216
-
nmax [r/min]
587
882
1030
1101
-
Problem 7.24
part (a): At no load, Ea,nl = Km ωm,nl = Va . Thus
ωm,nl =
85
Va
= 405 rad/sec
=
Km
0.21
Hence, the full-load speed is ωm,nl (30/π) = 3865 r/min.
part (b): At zero speed, the current will be Ia = Va /Ra = 44.7 A and the
corresponding torque will be T = Km Ia = 9.4 N·m.
part (c):
T = Km Ia =
Km (Va − Km ωm )
Km (Va − Ea )
=
Ra
Ra
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Here is the desired plot, obtained using MATLAB:
Problem 7.25
part (a): At no load, ωm,nl = 11, 210(π/30) = 1174 rad/sec and Ea,nl =
Va − Ia,nl Ra = 4.94 V. Thus
Km =
Ea,nl
= 4.21 × 10−3 V/(rad/sec)
ωm,nl
part (b): The no load rotational losses are
Prot,nl = Ea,nl Ia,nl = 62 mW
part (c): At zero speed, the current will be Ia = Va /Ra = 1.09 A and the
corresponding torque will be T = Km Ia = 4.6 mN·m.
part (d): The output power versus speed characteristic is parabolic as shown
below.
An iterative MATLAB scripts can easily find the two desired operating points:
2761 r/min for which the efficiency is 24.3% and 8473 r/min for which the
efficiency is 72.8%.
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Problem 7.26
No numerical solution required for this problem.
Problem 7.27
Based upon the calculations of Problem 7.25, at 8750 r/min, the rotational
losses will be 29.4 mW. Thus, the total required electromechanical power will
be P = 779 mW. The generated voltage will be Ea = Km ωm = 3.86 V and the
armature current will thus be Ia = P/Ea = 0.202 A.
Thus the desired armature voltage will be
Va = Ea + Ra Ia = 4.79 V
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PROBLEM SOLUTIONS: Chapter 8
Problem 8.1
part (a): In this case, β = 45◦ = π/4 rad and
Lmax =
N 2 µ0 βRD
= 96 mH
2g
and there is a 15◦ overlap region of constant inductance.
part (b):
Tmax,1 =
Lmax I12
= 6.1 × 10−2 I12 N · m
2β
Tmax,1 =
Lmax I22
= 6.1 × 10−2 I22 N · m
2β
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part (c): i1 = i2 = 5 A;
(i) ω = 0 Tnet = 0
(ii) ω = 45◦ Tnet = 0 (iii) ω = 75◦
Tnet = 1.53 N·m
Problem 8.2
When a single phase is excited, magnetic circuit analysis can show that all
the mmf drop occurs across the two air gaps associated with that phase. Thus,
there is no additional mmf available to drive flux through the second phase.
Problem 8.3
Same argument as in the solution of Problem 8.3.
Problem 8.4
part (a) and (b):
Lmax =
DRαµ0 N 2
= 21.5 mH
2g
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part (c):
I0 =
2gB
= 6.96 A
µ0 N
part (d):
Tmax =
I02
2
Lmax
α/2
= 1.99 N · m
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part (e):
phase 1 ON:
−120◦ ≤ θ ≤ −90◦ , −30◦ ≤ θ ≤ 0◦ , 60◦ ≤ θ ≤ 90◦ , 150◦ ≤ θ ≤ 180◦
phase 2 ON:
−150◦ ≤ θ ≤ −120◦, −60◦ ≤ θ ≤ −30◦ , 30◦ ≤ θ ≤ 60◦ , 120◦ ≤ θ ≤ 150◦
phase 3 ON:
−180◦ ≤ θ ≤ −150◦, −90◦ ≤ θ ≤ −60◦ , 0◦ ≤ θ ≤ 30◦ , 90◦ ≤ θ ≤ 120◦
part (f): The rotor will rotate 90◦ in 30 msec.
n=
(1/4) r
= 7.14 r/sec = 429 r/min
35 msec
The rotor will rotate in the clockwise direction if the phase sequence is 1 - 2 3 - 1 ....
Problem 8.5
When the rotor is aligned with any given pole pair, it is clearly med-way
between the other two pole pairs. Thus rotation in one direction will increase
the inductance of one set of poles and decrease the inductance of the remaining
set. Thus, depending on which of the remaining poles is excited, it is possible
to get torque in either direction.
Problem 8.6
The rotor will rotate 15◦ as each consecutive phase is excited. Thus, the rotor
will rotate 1 revolution in 24 sequences of phase excitation or 8 complete sets of
phase excitation. Thus, the rotor will rotate 1 revolution in 8 × 15 = 120! msec.
Thus it will rotate at 1/0.12 = 8.33 r/sec = 500 r/min.
Problem 8.7
part (a): If phase 1 is shut off and phase 2 is turned on, the rotor will move
to the left by 2β/3 ≈ 4.29◦ . Similarly, turning off phase 2 and turning on phase
3 will cause the rotor to move yet another 4.29◦ . Thus, starting with phase 1
on, to move 21.4◦ /4.29◦ ≈ 5 steps, the sequence will be:
1
2
3
1
2
OFF
OFF
OFF
OFF
OFF
1 ON
& 2 ON
& 3 ON
& 1 ON
& 2 ON
& 3 ON
part (b): Clockwise is equivalent to rotor rotation to the right. The required
phase sequence will be ... 1 - 3 - 2 - 1 - 3 - 2 .... The rotor will rotate ≈ 4.29◦/step
and hence the rotor speed will be
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125 r/min ×
360◦ 1 step
×
= 1.05 × 104 steps/min
r
4.29◦
Thus the required step time is
time
1 min
60 sec
=
×
= 5.72 msec/step
step
8400 step
min
Problem 8.8
part (a): When phase 1 is energized, the rotor will be aligned as shown in
the following figure:
From the figure, we see that if phase 1 is turned off and phase 2 is energized, the
rotor will rotate 4.61◦ degrees to the right (clockwise) to align with the phase-2
pole. Similarly, if phase 3 is excited after phase 1 is turned off, the rotor will
rotate 4.61◦ degrees to the left (counterclockwise).
part (b):
80 r/min ×
360◦
1 step
= 6.25 × 103 steps/min
×
r
4.61◦
60 sec
1 min
time
×
=
= 9.6 msec/step
step
6.25 × 103 step
min
The required phase sequence will thus be ... 1 - 3 - 2 - 1 - 3 - 2 - 1 ....
Problem 8.9
part (a): For time in which the current is building up
i1 (t) =
100t
A
0.005 + 57.5t
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This expression is valid until time t = 2.22 msec, at which point i1 (t) = 1.67 A.
part (b):
i1 (t) =
0.22 − 200(t − 2.22 × 10−3 )
0.05 + 57.5(4.44 × 10−3 ) − 7
This expression is valid until time t = 3.32 msec.
part (c): Here are the desired plots
The integral under the torque curve is 2.38 × 10−4 N·m·sec while the positive
torque integral is 3.29 N·m·sec. Thus there is a 25.7% reduction in torque due
to negative torque production during the current-decay period.
Problem 8.10
part (a): For time in which the current is building up
i1 (t) =
100t
A
0.005 + 57.5t
This expression is valid until time t = 2.22 msec, at which point i1 (t) = 1.67 A.
part (b):
i1 (t) =
0.22 − 250(t − 2.22 × 10−3 )
0.05 + 57.5(4.44 × 10−3 ) − 7
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This expression is valid until time t = 3.10 msec.
part (c): Here are the desired plots
The integral under the torque curve is 2.59 × 10−4 N·m·sec while the positive
torque integral is 3.20 N·m·sec. Thus there is a 19.0% reduction in torque due
to negative torque production during the current-decay period.
Problem 8.11
part (a): The phase inductance looks like the plot of Problem 8.4, part (a),
with the addition of the Lleak = 4.5 mH leakage inductance. Now Lmax =
21.5 + 4.5 = 26.0 mH.
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part (b): For −30◦ ≤ θ ≤ 0◦
21.5 mH
dL
=
= 20.5 mH/rad
dθ
π/3 rad
ωm =
1750 r 2πrad
1min
dθ
=
×
×
= 183 rad/sec
dt
min
r
60sec
dL
dL
= ωm
= 3.76 Ω
dt
dθ
The governing equation is
v = iR + L
di
dL
+i
dt
dt
Noting that dL/dt >> R, we can approximate this equation as
v≈
d(Li)
dt
and thus
i(t) =
v(t) dt
L(t)
Substituting v(t) = 75 V and L(t) = 4.5 × 10−3 + 3.76t then gives
i(t) =
75 t
4.5 × 10−3 + 3.76t
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which is valid over the range 0 ≤ t ≤ 5.71 msec, at which time i(t) = 16.5 A.
Here is the desired plot:
part (c): During this time, starting at time t = 5.71 msec, v(t) = −75 V
and L( t) = 26.0 × 10−3 − 3.76(t − 5.71 × 10−3 ). Thus
i(t) = 16.5 +
−75 (t − 5.71 × 10−3 )
26.0 × 10−3 − 3.76(t − 5.71 × 10−3 )
which reaches zero at t = 8.84 msec. Here is the plot of the total current
transient.
part (d): The torque is given by
T =
Here is the plot:
i2 dL
2 dθ
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Problem 8.12
part (a): The plot of Lθ is shown below
Here, from Examples 8.1 and 8.3, Lleak = 5 mH and Lmax = 133 mH.
part (b): The solution for −67.5◦ ≤ θ ≤ −7.5◦ (0 ≤ t ≤ 2.5 msec) is exactly
the same as part (a) of Example 8.3
i(t) =
100t
A
0.005 + 51.2t
For −7.5◦ ≤ θ ≤ 7.5◦ (2.5 msec ≤ t ≤ 3.13 msec), dL/dt = 0 and thus
v = iR + L
di
di
⇒ −100 = 1.5i + 0.133
dt
dt
This equation has an exponential solution with time constant τ = L/R =
88.7 msec.
i = −66.7 + 68.6e−(t−0.0025)/0.0887
At t = 3.13 msec, i(t) = 1.39 A.
Following time t = 3.13 msec, the solution proceeds as in Example 8.3. Thus
i(t) = 1.468 −
100 − 3.13 × 10−3
0.005 − 51.2(t − 5.63 × 10−3 )
The current reaches zero at t = 4.25 msec. Here is the corresponding plot,
produced by MATLAB
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part (c):
T =
Problem 8.13
part (a):
i2 dL
2 dθ
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part (b):
Inverter volt − ampere rating
= 1.55
Net output power
part (c): Pmech = 2968 W.
Problem 8.14
part (a): Based upon the discussion in the text associated with Fig. 8.18,
the following table can be produced:
θm
0◦
45◦
90◦
135◦
180◦
225◦
270◦
315◦
bit pattern
1000
1010
0010
0110
0100
0101
0001
1001
i1
I0
I0
0
−I0
−I0
−I0
0
I0
i2
0
I0
I0
I0
0
−I0
−I0
−I0
part (b): There will be 8 pattern changes per revolution. At 1200 r/min
= 20 r/sec, there must be 160 pattern changes per second, corresponding to a
time of 6.25 msec between pattern changes.
Problem 8.15
part (a): The rotor will rotate 2◦ counter clockwise.
part (b): The phase excitation will look like (with T = 41.7 msec):
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part (c):
8r
2880◦
48◦
2◦
=
=
=
min
min
sec
41.7 msec
The frequency will be
f=
1
= 6 Hz
4T
Problem 8.16
part (a): The displacement will be 360◦ /(3 × 14) = 8.571◦.
part (b): There will be one revolution of the motor for every 14 cycles of the
phase currents. Hence
900 r
1 min
14 cycles
f=
= 210 Hz
min
60 sec
r
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PROBLEM SOLUTIONS: Chapter 9
Problem 9.1
part (a):
Iˆmain =
V̂
Zmain
= 13.8 − 56.4◦ A
V̂
Iˆaux =
= 9.9 − 49.2◦ A
Zaux
part (b): We want the angle of the auxiliary-winding current to lead that
′
= Zaux + jXC
of the main winding by 90c (π/2 rad). Thus, defining Zaux
(XC = 1/ωC), we want
′
Zaux
= tan−1
Im[Zaux ] − XC
π
= Zmain +
Re[Zaux ]
2
Thus XC = 14.5 Ω and C = 183 µF.
part (c):
Iˆmain =
V̂
Zmain
= 13.8 − 56.4◦ A
V̂
Iˆaux = ′ = 12.6 33.6◦ A
Zaux
Problem 9.2
The solution is basically the same as for Problem 9.1, but now with Zmain =
4.82 + j6.04 Ω and Zaux = 7.95 + j7.68 Ω and ω = 100π.
part (a):
Iˆmain = 15.5 − 51.4◦ A
Iˆaux = 10.9 − 44.0◦ A
part (b): C = 227 µF.
part (c):
Iˆmain = 15.5 − 51.4◦ A
Iˆaux = 11.8 38.6◦ A
Problem 9.3
No numerical solution required.
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Problem 9.4
Imain = 3.48 A
power factor = 0.59
Pout = 132 W
speed = 1719 r/min
Torque = 0.732 N·m
efficiency = 58.5 %
Problem 9.5
The solution follows that of Example 9.2.
Imain = 4.38 A
power factor = 0.65
Pout = 204 W
speed = 1724 r/min
Torque = 1.13 N·m
efficiency = 63.0 %
Problem 9.6
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Problem 9.7
part (a): From Eq. 4.6, the peak amplitude, in space and time, of the mmf
waves are given by
4 kw Nph
Fpeak =
Ipeak
π
poles
Thus
Fmain,peak
4
=
π
4
π
42
4
20.7
√ 2 = 391 A · turns
and
Faux,peak =
68
4
11.1
√ 2 = 340 A · turns
part (b): The auxiliary winding current must be phase shifted by 90◦ from
that of the main winding and the mmf amplitudes must be equal. Hence, Iaux
should be increased to
Nmain
Iaux = Imain
= 12.8 A
Naux
Problem 9.8
The internal torque is proportional to Rrmf − Rb and thus is equal to zero
when Rf = Rb . From Example 9.2,
2
Xm,main
1
Rf =
X22
sQ2,main + 1/(sQ2,main)
and
Rb =
2
Xm,main
X22
1
(2 − s)Q2,main + 1/((2 − s)Q2,main )
We see that Rf = Rb if (2 − s)Q2,main = 1/(sQ2,main) or
1
s=1± 1+
Q2,main
and thus
n = ns (1 − s) = ±ns
where ns is the synchronous speed in r/min.
1+
1
Q2,main
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Problem 9.9
The solution follows that of Example 9.3.
part (a): Iα = 34.5 − 32.3◦ A, Iβ = 7.1 30.0◦ A
part (b): Pmech = 6700 W
Problem 9.10
part (a): Following the calculations of Example 9.3 with s = 1, Tmech =
14.8 N·m.
part (b): Setting
Vα = 230 V
Vβ = 230ej90
◦
V
gives Tmech = 16.4 N·m.
part (c): Letting V̂α = Vα and V̂β = jVβ gives
Vf =
Vα + jVβ
;
2
Vb =
Vα − jVβ
2
Ib =
Vb
Vα − jVβ
=
Z
2Z
Let Z = R1 + jX1 + Zf . Thus
If =
Vα + jVβ
Vf
;
=
Z
2Z
Rf (If2 − Ib2 )
Pgap,f − Pgap,b
=
=
T =
ωs
ωs
Rf
|Z|2
Vα Vβ
Clearly, the same
torque would be achived if the phase voltages were each equal
in magnitude to Vα Vβ .
Problem 9.11
The impedance Z must be added to the impedances of the motor of Problem
9.9. The solution then proceeds as in Example 9.3. The terminal voltage can
be found as
V̂t,α = V̂α − Iˆα Z
V̂t,β = V̂β − Iˆβ Z
For
V̂α = 235 0◦ ;
V̂β = 212 78◦
a MATLAB analysis gives
V̂t,α = 205 − 8.0◦ ;
V̂t,β = 194 73◦
which is clearly more balanced than the applied voltage.
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Problem 9.12
part (a): slip s = 0.035
V̂f =
1
(V̂α − j V̂β ) = 214.8 − 12.5◦ V
2
V̂b =
1
(V̂α + j V̂β ) = 47.6 77.5◦ V
2
Zf and Zb can be calculated from Eqs. 9.4 and 9.5 with s = 0.035
Iˆf =
V̂f
= 2.99 − 64.0◦
R1 + jX1 + Zf
Iˆb =
V̂b
= 4.48 0.7◦
R1 + jX1 + Zb
Pgap,f = 2If2 Rf = 784 W
Tgap =
Pgap,b = 2Ib2 Rb = 65.9 W
(Pgf − Pgb )
= 3.81 N · m
ωs
part (b): Repeating the analysis of part (a) with s = 1 gives Tstart = 12.0n·m.
part (c): Now we have a two-phase machine operating under balanced twophase conditions. We can now apply the analysis of Section 6.5.
jXm (R1 + jX1 )
V1,eq = V1
= 208 V
R1 + j(X1 + Xm )
and R1,eq + jX1,eq = jXm in parallel with R1 + jX1 = 0.698 + j5.02 Ω.
Thus
smax,T =
R2
2
R1,eq
+ (X1,eq + X2 )2
= 0.348
and
Tmax =

1 
ωs R
1,eq +
2
0.5nph V1,eq
2
R1,eq
+ (X1,eq + X2 )2

 = 20.8 N · m
part (d): Now we have a single-phase machine operating with Vα = 220 V
and s = 0.04
Iˆα =
Vα
= 5.73 − 52.3◦ A
(R1 + jX1 0.5(Zf + Zb )
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Pgap = 0.5Iα2 (Rf − Rb ) = 691 W
Pmech = Pgap (1 − s) = 664 W
and finally
Pout = Pmech − Prot = 599 W
part (e):
Iˆf = Iˆb = 0.5Iˆα = 2.82 − 52.3◦
V̂f = (R1 + jX1 + Zf )Iˆf ;
V̂b = (R1 + jX1 + Zb )Iˆb
and thus
V̂β = j(Vf − Vb ) = 0.5j Iˆα (Zf − Zb ) = 167 81.3◦ V
In other words, the open-circuit voltage across the β winding will be 167 V.
Problem 9.13
This problem can be solved using a MATLAB script similar to that written
for Example 9.5.
part (a): Tstart = 0.28 N·m.
part (b): Imain = 19.3 A; Iaux = 3.2 A
part (c): I = 21.3 A and the power factor is 0.99 lagging
part (d): Pout = 2205 W
part (e): Pin = 2551 W and η = 86.4%
Problem 9.14
This problem can be solved using a MATLAB script similar to that written
for Example 9.5. An iterative search gives C = 70.4 µF and an efficiency of
87.1%.
Problem 9.15
This problem can be solved using a MATLAB script similar to that written
for Example 9.5. An iterative search shows that the minimum capacitance is
80.9 µF.
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Problem 9.16
part (a):
parts (b) and (c):
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PROBLEM SOLUTIONS: Chapter 10
Problem 10.1
part (a):
part (b):
Vrms =
1
T
0
T
2 (t)
vR
dt =
2
T
T /4
0
4V0 t
T
2
V0
dt = √ = 3.67 V
6
2
part (c): < pdiss >= Vrms
/R = 9 mW.
Problem 10.2
part (a): The diode does not turn on until the source voltage reaches 0.6 V,
which occurs at time t = (0.6/4V0 )T = T /60.
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part (b):
Vrms =
2
T
T /4
T /60
4 × 8.4t
T
2
dt = 3.43 V
2
part (c): < pdiss >= Vrms
/R = 7.8 mW.
Problem 10.3
Vrms =
2
T
T /4
td
4V0 t
T
2
32V02
dt =
3
1
−
43
td
T
3 Problem 10.4
Problem 10.5
part (a): Peak VR = 310 V.
part (b): Ripple voltage = 25.7 V.
part (c): Time-averaged power dissipated in the load resistor = 177 W.
part (d): Time-averaged power dissipated in the diode bridge = 0.41 W.
Problem 10.6
If vs (t) ≥ 0, diode D1 is ON, diode D2 is off and the inductor current is
governed by the following differential equation:
L
di
+ Ri = vs (t)
dt
of vs (t) < 0, diode D1 is off and diode D2 is on and the inductor current is
governed by the differential equaion:
L
di
+ Ri = 0
dt
A simple integration implemented in MATLAB produces the following plot:
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Problem 10.7
Problem 10.8
part (a): Letting T = 2π/ω
Vdc =
1
T
T /2
V0 sin ωt =
0
V0
= 14.3 V
π
part (b):
Idc =
Vdc
= 2.9 A
R
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part (c):
part (d):
Problem 10.9
part (a): Letting T = 2π/ω
Vdc =
1
T
T /2
td
V0 sin ωt =
V0
(1 + cos ωtd )
2π
part (b):
Idc =
V0
Vdc
=
(1 + cos ωtd )
R
2πR
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part (c):
Problem 10.10
part (a): Letting T = 2π/ω
Vdc =
2
T
T /2
td
V0 sin ωt =
V0
(1 + cos ωtd )
π
part (b):
Idc =
part (c):
V0
Vdc
=
(1 + cos ωtd )
R
πR
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part (d):
Problem 10.11
part (a):
(i)
(ii)
Vdc =
1
π
5π/4
V0 sin θ dθ =
π/4
V0
V0
cos α2 = √
π
π 2
(iii)
Pload = Vdc Idc =
V0 Idc
√
π 2
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part (b):
(i)
(ii)
Vdc =
1
π
7π/4
V0 sin θ dθ =
3π/4
V0
V0
cos α2 = − √
π
π 2
(iii)
V0 Idc
Pload = Vdc Idc = − √
π 2
The power is negative, hence energy is being extracted from the load.
Problem 10.12
part (a) From Eq. 10.11
Idc =
2V0
= 18.3 A
πR + 2ωLs
and from Eq. 10.8
2Idc ωLs
1
−1
1−
= 3.12 msec
tc = cos
ω
V0
part (b): For Ls = 0
Idc =
2V0
= 23.6 A
πR
Problem 10.13
part (a): At 1650 r/min, the generated voltage of the dc motor is equal to
1650
Ea = 85
= 81.3 V
1725
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The motor input power will then be
Pin = Ia (Ea + Ia Ra ) = 665 W
part (b):
Vdc =
2V0
π
√
2 2 × 115
cos αd = 103.5 cos αd V
cos αd =
π
Thus for Vdc = Ea + Ia (Ra + RL ) = 90.5 V, αd = 29.1◦ .
Problem 10.14
The rated current of this motor is
Irated =
1000
Prated
=
= 11.8 A
Vrated
85
The controller must limit Idc to twice Irated or 23.6 A. Under this condition,
Vdc = Ia (Ra + RL ) = 28.5 V.
From part (b) of the solution to Problem 10.13,
Vdc = 103.5 cos αd V
and thus the controller must set αd = 74.0◦ .
Problem 10.15
The required dc voltage is Vf = If Rf = 277 V. From Eq. 10.19,
πVf
Vl−l,rms = √ = 204 V, rms
3 2
Problem 10.16
The required dc voltage is Vf = If Rf = 231 V. From Eq. 10.20,
πVf
−1
√
αd = cos
= 39.0◦
3 2 Vl−l,rms
Problem 10.17
part (a): The magnet resistance is sufficiently small that its voltage drop
can be ignored while the magnet is being charged. The desired charge rate is
di
= 80 A25 sec = 3.2 A/sec
dt
Thus the required dc voltage will be
Vdc = L
di
= 15.7 V
dt
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Thus
αd = cos
−1
πV
√ dc
3 2 Vl−l,rms
= cos−1
π 15.7
√
3 2 × 15
= 39.3◦
part (b): Constant current simply requires a dc voltage of Vdc = RIdc =
3.6 × 10−3 × 80 = 0.29 V. Thus
π 15.7
πVdc
−1
√
√
αd = cos
= cos−1
= 89.2◦
3 2 Vl−l,rms
3 2 × 0.288
Problem 10.18
part (a):
V1
2πt
2πt
2 T
8 DT /2
v(t) cos
V0 cos
dt =
dt
T 0
T
T 0
T
V0
sin πD = 51.5 V
4π
=
=
part (b):
Harmonic number
1
2
3
4
5
6
7
8
9
10
Peak amplitude [V]
51.5
0
6.6
0
12.7
0
2.8
0
5.7
0
Problem 10.19
part (a):
3
V3 =
T
A3 = 0 for D = 1/3
0
T
v(t) cos
6πt
T
dt =
4V0
sin (3πD)
3π
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part (b):
Harmonic number
1
2
3
4
5
6
7
8
9
10
Peak amplitude [V]
55.1
0
0.007
0
11.0
0
7.9
0
0.007
0
Problem 10.20
part (a):
Time period
0 ≤ ωt < αd + DT /2
αd + DT /2 ≤ ωt < π + αd − DT /2
π + αd − DT /2 ≤ ωt < π + αd + DT /2
π + αd + DT /2 ≤ ωt < 2π + αd − DT /2
2π + αd − DT /2 ≤ ωt < 2π
S1
ON
ON
OFF
OFF
ON
S2
OFF
ON
ON
OFF
OFF
S3
ON
OFF
OFF
ON
ON
part (b): By analogy to the solution of Problem 10.18, part (a)
I1 =
I0
sin πD
4π
and by inspection φ1 = αd .
part (c):
p(t) =< i1 (t)vL (t) >=
Va I1
Va I0
cos φ1 =
cos αd
2
8π
Problem 10.21
From Eq. 10.34
(iL )avg =
[2D − 1]V0
= 17.65 A
R
From Eq. 10.29
(iL )min = −
V0
R
T
1 − 2e −T (1−D)
τ
+ e− τ
T
(1 − e− τ )
= 17.45 A
and from Eq. 10.20
(iL )max =
V0
R
T
1 − 2e −DT
τ
+ e− τ
T
(1 − e− τ )
= 17.84 A
Finally
Ripple = (iL )max − (iL )min = 0.39 A
S4
OFF
OFF
ON
ON
OFF
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PROBLEM SOLUTIONS: Chapter 11
Problem 11.1
part (a): From the no-load data
Kf =
120
Ea,nl
=
= 0.953
ωm,nl If,nl
(1718π/30) × 0.7
Combining
T =
Ea Ia
ωm
and
Va = Ea + Ia Ra
gives
Ea
Thus
= 0.5 Va + Va2 − 4ωm T Ra
= 0.5 120 + 1202 − 4(1800π/30) × 15.2 × 0.145 = 116.4 V
If =
Ea
= 0.648 A
ωm K f
and, defining If,max = 120/104 = 1.14 A,
D=
If
If,max
= 0.567
part (b): If = 0.782 A and D = 0.684.
part (c):
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Problem 11.2
part (a): If = 0.645 A and D = 0.565.
part (b): If = 0.784 A and D = 0.686.
part (c):
Problem 11.3
part (a): From part (a) of Problem 11.1, kf = 0.953. For Ea = 120 V and n
= 1300 r/min (ωm = 1300π/30) and thus
If,1 =
Ea
= 0.925 A
ωm K f
and
D=
If
= 0.809
If,max
where If,max = 1.14 A as found in Problem 11.1.
part (b): If,2 = DIf,max = 0.686 A.
ωm =
Ea
= 183.7 r/min
If Kf
and thus n = 30ωm /π.
part (c):
if (t) = If,2 + (If,1 − If,2 )e−t/τ = 0.686 + 0.239e−t/τ
where τ = Lf /Rf = 35.2 msec.
part (d):
J
dωm
= Kf if (t)Ea = Kf if (t)
dt
where if (t) is as given in part (c).
Va − Kf if (t)ωm
Ra
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Problem 11.4
part (a):
Ea,nl = Va − Ra Inl = 239.7 V
The rotational loss is given by Prot = Ea,nl Ia,nl = 374 W.
Based upon If = Va /Rf = 1.81 A,
ωm,nl =
Ea,nl
= 312.5 r/min
If Kf
and thus nnl = 30ωm,nl /π = 2984 r/min.
part (b):
part (c):
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part (d):
Problem 11.5
part (a): First convert Km to SI units.
Km = 2.18 × 10−4
1r/min
V
= 2.08 mV /(rad/sec)
r/min π/30 rad/sec
Tstall = 0.094 oz/cdotin = 6.64 × 10−4 N · m. At stall, Ia,stall = Tstall /Km =
0.319 A. Thus
3
Va
= 9.41 Ω
=
Ra =
Ia
0.319
π
part (b): ωm,nl = nnl 30
= 1299 rad/sec. Thus Ea,nl = ωm,nl Km,nl =
2.70 V.
Va − Ea,nl
Ia,nl =
= 31.5 mA
Ra
and thus the no-load rotational loss is
Prot = Ea,nl Ia,nl = 85.3 mA
part (c):
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Problem 11.6
π
part (a): ωm,nl = nnl 30
= 374.9 rad/sec.
Ea,nl = Va − Ia,nl Ra = 24.0 V
Km =
Ea,nl
= 63.9 mV/(rad/sec)
ωm,nl
part (b): Prot = Ea,nl Ia,nl = 11.3 W
part (c):
D
0.80
0.75
0.70
0.65
0.60
0.55
0.50
Ia [A]
13.35
12.70
12.05
11.40
10.70
10.05
9.30
r/min
3393
3179
2964
2749
2535
2320
2107
Pload [W]
293
261
231
203
176
151
127
Problem 11.7
The rotor acceleration is governed by the differential equation:
J
dωm
= T = Km Ia
dt
Converted to kg·m2 , the moment of inertia is 4.52 × 10−9 kg·m2 . Thus, to get
to the final speed ωm = 1.2 × 104 π/30 = 1257 rad/sec,
t=
(4.5 × 10−9 ) × 1257
Jωm
= 27.3 msec
=
Km Ia
(2.08 × 10−3 ) × 0.1
Problem 11.8
part (a):
Ia,rated =
Prated + Prot
1187
= 8.12 A
=
ωm,rated Km
(3000π/30) × 0.465
Trated = Km Ia,rated = 3.78 N · m
part (b): Tload = Km Ia − Trot . Here Trot = 87/(3000π/30) = 0.27 N·m.
Thus Tload = 2.61 N·m and Pload = Tload ωm = 729 W.
part (c): The differential equation governing the motor speed is
πJ dn
dωm
=
= Tmech − Trot − Tload
J
dt
30 dt
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Here, n is the motor speed in r/min, Tmech = Km Ia = 0.465 × 7.0 = 3.26 N·m
and, from part (b),
n = 0.273 n N · m
Tload = 729
2670
Thus, the differential equation is
dn
+ 4.094 n − 1.252 × 104 = 0
dt
and the solution is
n = 3051 − 381e−t/τ r/min
where τ = 0.255 sec.
Problem 11.9
From the solution to Problem 11.8, Ia,rated = 8.12 A. Neglecting rotational
losses, the motor speed can be calculated from the differential equation
J
dωm
= Tmech = −KmIa,rated
dt
and thus
ωm = ωm,0 −
Km Ia,rated
J
t
and thus the motor will reach zero speed at time
t=
Jωm,0
(1.86 × 10−3 ) × (3000π/30)
=
= 0.155 sec
Km Ia,rated
0.465 × 8.12
Problem 11.10
part (a): Rated speed = 120f /poles = 1800 r/min.
part (b):
Prated
Irated = √
= 138.0 A
3 Vrated
part (c): In per unit, Va = 1.0 and P = 1000/1100 = 0.909. Thus, Ia = 0.909
and
Eaf = Va − jXs Ia = 1.55 − 49.7◦ per unit
Thus If = 1.55 × 85 = 131 A.
part (d): The inverter frequency will equal f = 60(1300/1800) = 43.3 Hz
and the motor power input will be P = 1000(1300/1800)2.5 = 443 W. If one
scales the base voltage and base power with frequency then the base impedance
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will scale with frequency. Hence, under this new operating condition, the perunit terminal voltage, generated voltage and synchronous reactance will be unchanged while the per-unit power will be P = 443/(1100 × 43.3/60) = 0.558 per
unit. Thus
P Xs
δ = − sin−1
= −27.9circ
Va Eaf
and Êaf = 1.55
−27.9◦
Va − Êaf
Iˆa =
= 0.688 26.8◦
jXs
Thus the power factor is cos−1 (26.8◦ ) = 0.89 leading.
part (e): Continuing with the base quantities of part (d), Ia = 0.558 per
unit and
Eaf = Va − jXs Ia = 1.20 − 47.0◦ per unit
and thus If = 1.20 × 85 = 102 A.
Problem 11.11
part (a): No numerical calculation required.
part (b):
1500 r/min:
Va = 3.83 kV, l − l
Pmax = 833 kW
If = 131 A
2000 r/min:
Va = 4.60 kV, l-l
Pmax = 1000 kW
If = 126 A
Problem 11.12
Ls = 5.23 mH
Laf = 63.1 mH
Trated = 531 N · m
Problem 11.13
part (a):
Laf = √
√
2 Vbase
= 63.1 mH
3 ωbase AFNL
Ls can be calculated from the per-unit value of Xs .
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Zbase =
2
Vbase
= 2.12 Ω
Pbase
and Lbase = Zbase /ωbase = 5.6 mH. Thus,
Xs =
Ls =
Xs
= 1.97 Ω
Zbase
Xs
= 5.23 mH
Lbase
part (b): ωm,base = ωbase (2/poles) = 60π and Tbase = Pbase /ωm,base =
531 N·m. Thus, T = 0.5 Tbase = 265 N·m.
2
2
T
iQ =
= 100 A
3
poles
Laf If
iQ
Ia = √ = 70.8 A, rms
2
part (c):
Eaf =
ωbase Laf If
√
= 235 V
2
Because iD = 0, Iˆa and Êaf both lie along the quadrature axis. Thus, the
terminal voltage magnitude will be given by
Va = |Eaf + jXs Ia | = 274 V, l-n = 474 V, l-l
Problem 11.14
part (a): The various machine parameters were calculated in the solution to
Problem 11.13. T = 0.75Tbase = 398 N·m and ωm = 1475π/30 = 154.5 rad/sec.
Thus, P = ωm T = 61.5 kW.
part (b):
2
2
T
= 145.1 A
iQ =
3
poles
Laf If
iQ
Ia = √ = 102.6 A, rms
2
part (c): fe = 60(1475/1800) = 49.2 Hz.
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part (d):
ωbase Laf If
√
= 200 V
2
Eaf =
Because iD = 0, Iˆa and Êaf both lie along the quadrature axis. Thus, the
terminal voltage magnitude will be given by
Va = |Eaf + jXs Ia | = 260 V, l-n = 450 V, l-l
Problem 11.15
part (a): The various machine parameters were calculated in the solution to
Problem 11.13. With Tref increased to 0.8Tbase = 424 N·m
2
2
Tref
= 160.3 A
iQ =
3
poles
Laf If
iQ
Ia = √ = 113.3 A, rms
2
Eaf =
ωbase Laf If
√
= 235.3 V
2
Because iD = 0, Iˆa and Êaf both lie along the quadrature axis. Thus, the
terminal voltage magnitude will be given by
Va = |Eaf + jXs Ia | = 324.5 V, l-n = 562.1 V, l-l = 1.22 per unit
part (b): The required calculations follow those of Example 11.9.
(i) The terminal voltage will be set equal to 460 V, l-l (1.0 per unit).
(ii) The line-to-neutral terminal voltage is Va,l−n = 460/sqrt3 = 265.6 V.
Thus
Ia =
(ωm Tref
= 100.4 A, rms
3Va,l−n
(iii)
δ = tan
−1
ωm Ls Ia
Va,l−n
= −26.7◦
Thus
irmQ =
√
2 Ia sin δ = 113.8 A
irmD =
√
2 Ia sin δ = −84.9 A
and
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(iv)
2
2
Tref
If =
= 19.7 A
3
poles
Laf iQ
Problem 11.16
T = 4431 N·m
If = 121.7 A
iD = -78.4 A
iQ = 95.5 A
Ia = 87.4 A, rms
Va = 1993 V, rms, l-l
Problem 11.17
part (a):
ΛPM
√
√ √ 2 Va,rated, l-n
2 230/ 3
= 0.512 Wb
=
=
ωm,rated
3500π/30
part (b): The frequency
will be 60 Hz and hence Xs = ωe Ls = 3.24 Ω.
√
Eaf = (3600/3500)(230/ 3) = 136.6 V. Ia,rated = 2000/(sqrt3 230) = 5.02 A.
The armature current is equal to
Va,rated, l-n − Êaf
Ia =
jXs
Although the magnitude of Êaf = Eaf δ is known, its angle δ (required to
give Ia = Ia,rated ) is not. A MATLAB script can be used to easily iterate to
find that δ = −6.73 ◦. The motor power is then given by
3Eaf Va,rated, l-n
P =−
sin δ = 1.96 kW
Xs
Then,
T =
P
= 5.22 N · m
ωm
and
2
2
T
= 6.80 A
iQ =
3
poles
ΛPM
iD =
2
2Ia,rated
+ i2Q = 2.05 A
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Problem 11.18
As calculated in the solution to Problem 11.17, ΛPM = 0.512 Wb. At 4000
r/min, fe = (4000/3600)60 = 66.7 Hz and thus ωe = 2πfe = 418.9 rad/sec.
The rms line-to-neutral armature flux linkages under this operating condition
will be
√
2 Va,rated, l-n
= 0.448 Wb
λa =
ωe
and maximum torque will correspond to operating the motor at its rated armature current Ia = Ia,rated = 5.02 A.
Solving
λa
=
λ2D + λ2Q
2
=
(Ls + ΛPM )2 + (Ls iQ )2
2
=
2(Ls Ia )2 + 2Ls iD ΛPM + Λ2PM
2
for iD gives
iD =
2λ2a − 2(Ls Ia )2 − Λ2PM
= −4.38 A.
2Ls ΛPM
Thus
iQ =
2Ia2 − i2D = 5.62 A
Thus, the maximimum torque will be given by
3
poles
ΛPM iQ = 4.32 N · m
Tmax =
2
2
and, for a speed of 4000 r/min (ωm = 418.9 rad/sec)
Pmax = ωm Tmax = 1810 W
Problem 11.19
The rated current of this motor is
Prated
= 37.7 A
Ia,rated = √ 3 Va,rated, l-l
ΛPM
√ √
2 Va,rated, l-n
2(230/sqrt3)
= 0.235 Wb
=
=
ωe
7620π/30
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part (a): The torque will be maximized when iQ is maximized. In this case,
this will occur when iD = 0 and thus
√
iQ,max = 2 Ia,rated = 53.2 A
and thus
Tmax
3
poles
=
ΛPM iQ,max = 18.8 N · m
2
2
part (b): The peak line-to-neutral flux linkages are
λa =
Λ2PM + λ2Q =
Λ2PM + (Ls iQ,max )2 = 0.257 Wb
Thus, to avoid exceeding rated terminal voltage, the electrical frequency of
the motor must be limited to
√ 2 Va,rated, l-n
= 731.9 rad/sec
ωe,max =
λa
and the corresponding motor speed will be
30
n = ωe,max
= 6989 r/min
π
part (c): At 10,000 r/min, ωe = 10000π/30 = 1047 rad/sec. In order to
maintain rated terminal voltage, the peak line-to-neutral armature flux linkages
must now be limited to
√ 2 Va,rated, l-n
= 0.179 Wb
λa,max =
ωe
Thus, solving the peak line-to-neutral armature flux linkages
λa,max
=
λ2D + λ2Q
=
(Ls + ΛPM )2 + (Ls iQ )2
=
2(Ls Ia,rated )2 + 2Ls iD ΛPM + Λ2PM
2
for iD gives
iD =
and thus
λ2a,max − 2(Ls Ia,rated )2 − Λ2PM
= −37.3 A.
2Ls ΛPM
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iQ =
2
2Ia,rated
− i2D = 38.0 A
The motor torque is then given by
3
poles
T =
ΛPM iQ = 13.4 N · m
2
2
Since this is a two-pole machine and ωm = ωe , the corresponding power will be
P = ωm T = 14.1 kW.
The motor power factor will be
P
= 0.937
power factor = √ 3 Va,rated l-l Ia,rated
Problem 11.20
Problem 11.21
part (a): Following the analysis of Chapter 6
Z1,eq = R1,eq + X1,eq =
jXm (R1 + jX1 )
= 0.099 + j1.08Ω
R1 + j(X1 + Xm
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Tmax =
smaxT =
2
0.5nphV1,eq
= 234 N · m
ωs (X1,eq + X2 )
R2
2
+ (X1,eq + X2 )2
R1,eq
= 0.102 = 10.2%
part (b): ωs = 2πf (2/poles) = 60π = 188.5 rad/sec. At s = 0.029, ωm =
(1 − s)ωs = 183.0 rad/sec. The torque is given by
2
(R2 /s)
nph V1,eq
1
T =
= 126 N · m
ωs (R1,eq + (R2 /s))2 + (X1,eq + X2 )2
and the power is P = ωm T = 23.1 kW.
part (c): With the frequency reduced from 60 Hz to 30 Hz, ωs , the terminal
voltage and each reactance must be scaled by the factor (35/60). The torque
expression can be solved for the slip. This can most easily be done iteratively
with a MATLAB script. The result is s = 0.051 = 5.1%, the speed is 997 r/min
and the output power is 13.1 kW.
Problem 11.22
part (a):
part (b): The same MATLAB script can be used to iteratively find the drive
frequency for which smaxT = 1.0. The result is a drive frequency of 5.44 Hz and
a torque of 151 N·m.
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Problem 11.23
Problem 11.24
The motor torque is a function of the ratio R2 /s. The slip with R2,ext = 0
is
1200 − 1157
= 0.0358
1200
s0 =
and that with R2,ext = 0.87 Ω is
1200 − 1072
= 0.1067
1200
s1 =
Thus, solving
R2
R2 + 0.87
=
s0
s1
for R2 gives R2 = 0.44 Ω.
Problem 11.25
The motor torque is a function of the ratio R2 /s. The slip with R2,ext = 0
is
1200 − 1157
= 0.0358
1200
s0 =
The desired operating speed corresponds to a slip of
s1 =
1200 − 850
= 0.2917
1200
Thus substituting the value of R2 found in the solution to Problem 11.24 and
solving for R2,ext
R2 + R2,ext
R2
=
s0
s1
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for R2,ext gives R2,ext = 3.14 Ω.
Problem 11.26
part (a): If R1 is assumed negligible, the torque expression becomes
2
nph V1,eq
(R2 /s)
1
T =
ωs (R2 /s)2 + (X1,eq + X2 )2
Substituting the corresponding expressions for Tmax
2
1 0.5nphV1,eq
Tmax =
ωs X1,eq + X2
smaxT =
R2
X1,eq + X2
gives
T = Tmax
s
smaxT
2
+
smaxT
s
Defining the ratio of full-load torque to maximum torque as
k≡
1
Tfl
= 0.472
=
Tmax
2.12
the full-load slip can then be found as
k
√
sfl = smaxT
= 0.0414 = 4.14%
1 + 1 − k2
part (b): The full load rotor power dissipation is given by
sfl
= 3240 W
Protor = Pfl
1 − sfl
part (c): At rated load, ωm,rated = (1 − sfl )ωs == 180.7 rad/sec. The rated
torque is Trated = Prated /ωm,rated = 415 N·m.
Setting s = 1 gives
2
Tstart = Tmax
= 68.1% = 283 N · m
1
+
smaxT
smaxT
part (d): If the stator current is at its full load value, this means that R2 /s
is equal to its full load value and hence the torque will be equal to the full-load
torque, 415 N·m.
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part (e): The slip will be twice the original full load slip or 8.26%.
Problem 11.27
part (a):
sfl =
1200 − 1169
= 0.0258
1200
and thus the full-load rotor power dissipation is equal to
sfl
= 928 W
Protor = Pfl
1 − sfl
part (b): Defining
k≡
Tmax
= 2.45
Tfl
and using the derivation found in the solution to Problem 11.26 gives
smaxT = sfl k + k 2 − 1 = 0.1211
Thus the motor speed at maximim torque is nmax = 1200(1−smaxT) = 1055 r/min.
part (c): We want smaxT to increase by a factor of 1/0.1211 = 8.26. Thus
the rotor resistance must increase by this factor. In other words
R2 + R2,ext = 8.26R2
which gives R2,ext = 1.67 Ω.
part (d): The 50-Hz voltage will be (5/6) that of 60-Hz. Thus the applied
voltage will be 367 V, line-to-line.
part (e): If the frequency and voltage are scaled from their rated value by a
factor kf , the torque expression becomes
1
nph (kf V1,eq )2 (R2 /s)
T =
kf ωs0
(R2 /s)2 + (kf (X1,eq + X2 ))2
where ωs0 is the rated-frequency synchronous speed of the motor. Clearly, the
torque expression will remain constant if the slip scales invesely with kf . Thus
60
sfl,50 =
sfl,60 = 0.031
50
The synchronous speed at 50 Hz is 1000 r/min and thus
nfl,50 = 1000(1 − sfl,50 ) = 969 r/min
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Problem 11.28
part (a): From the data given in Problem 11.23, the motor inductances are:
L1 = 3.13 mH;
L2 = 3.50 mH;
Lm = 128 mH;
and thus
LS = L1 + Lm = 131.5 mH
and
LR = L2 + Lm = 131.9 mH
Ra = R1 = 108 mΩ and RaR = R2 = 296 mΩ. Finally, the rated motor torque
The peak flux linkages corresponding to rated voltage line-to-neutral voltage
are given by
√
√
2 Vbase
2 2400
√
√
=
= 5.19 Wb
λrated =
3 ωbase
3 (120π)
The required torque can be determined from the given power and speed as
Tmech =
Pmech
400 × 103
= 3327 N · m
=
ωm
1148π/30
Setting λDR = λrated gives
Tmech
2
2
LR
iQ =
= 146.1 A
3
poles
Lm
λDR
and
iD =
λDR
= 40.5 A
Lm
part (b):
i2D + i2Q
Ia =
2
= 107.2 A
part (c):
ωme = ωm
ωe = ωme +
and thus
poles
2
RaR
LR
= 360.6 rad/sec
iQ
iD
= 368.7 rad/sec
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fe =
ω2
= 58.7 Hz
2π
part (d):
Va
=
=
(Ra iD − ωe (LS −
L2m
2
LR )iQ )
+ (Ra iQ + ωe LS iD )2
2
1421 V, l-n = 2461 V, l-l
Problem 11.29
part (a): From the given data, the motor inductances are:
L1 = 0.915 mH;
L2 = 0.936 mH;
Lm = 49.34 mH;
and thus
LS = L1 + Lm = 50.25 mH
and
LR = L2 + Lm = 50.27 mH
Ra = R1 = 32.2 mΩ and RaR = R2 = 70.3 mΩ. Finally, the rated motor torque
The peak flux linkages corresponding to rated voltage line-to-neutral voltage
are given by
√
√
2 Vbase
2 230
= √
= 0.498 Wb
λrated = √
3 ωbase
3 (120π)
The motor torque is Tmech = 85(1300/1800) = 61.4 N·m. Setting λDR =
λrated , we can solve for iQ and iD
2
Tmech
2
LR
= 41.9 A
iQ =
3
poles
Lm
λDR
and
iD =
λDR
= 10.1 A
Lm
The motor mechanical velocity in electrical rad/sec is
poles
ωme = ωm
= 272.3 rad/sec
2
and thus
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ωe = ωme +
RaR
LR
iQ
iD
= 278.1 rad/sec
and
fe =
ω2
= 44.3 Hz
2π
part (b):
i2D + i2Q
Ia =
Va
=
2
(Ra iD − ωe (LS −
= 30.4 A
L2m
2
LR )iQ )
+ (Ra iQ + ωe LS iD )2
2
= 101.8 V, l-n = 176.3 V, l-l
part (c):
Sin =
√
3 Va Ia = 9.30 kVA
part (d):
Problem 11.30
The motor parameters are calculated in the solution to Problem 11.29.
part (a): The motor torque is Tmech = 85(1450/1800) = 68.5 N·m. Setting
λDR = λrated , we can solve for iQ and iD
2
2
LR
Tmech
iQ =
= 46.7 A
3
poles
Lm
λDR
iD =
λDR
= 10.1 A
Lm
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and
i2D + i2Q
Ia =
= 33.8 A
2
part (b):
The motor mechanical velocity in electrical rad/sec is
poles
ωme = ωm
= 303.7 rad/sec
2
and thus
ωe = ωme +
RaR
LR
iQ
iD
= 310.1 rad/sec
and
fe =
ω2
= 49.4 Hz
2π
part (c): iQ is now increased to 51.4 A and hence, with IDR and hence λDR
unchanged
3
poles
Lm
λDR iQ = 75.3 N · m
Tmech =
2
2
LR
Thus the motor speed is
n = 1800
Tmech
85
= 1595 r/min
and ωm = nπ/30 = 167.0 rad/sec.
Pmech = Tmech ωm = 11.4 kW
part (d): The terminal voltage is
Va
=
=
(Ra iD − ωe (LS −
L2m
2
LR )iQ )
+ (Ra iQ + ωe LS iD )2
2
125.6 V, l-n = 217.5 V, l-l
The drive frequency can be found from
poles
ωme = ωm
= 334.1 rad/sec
2
ωe = ωme +
RaR
LR
iQ
iD
= 341.2 rad/sec
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and
fe =
ω2
= 54.3 Hz
2π
part (e):
Sin =
√
3 Va Ia = 13.9 kVA
part (f): Iteration with a MATLAB script gives λDR = 95.3% of λrated .
Problem 11.31
part (a): From the given data, the motor inductances are:
L1 = 4.96 mH;
L2 = 6.02 mH;
Lm = 118.3 mH;
and thus
LS = L1 + Lm = 123.3 mH
and
LR = L2 + Lm = 124.3 mH
Ra = R1 = 212 mΩ and RaR = R2 = 348 mΩ. Finally, the rated motor torque
The peak flux linkages corresponding to rated voltage line-to-neutral voltage
are given by
√
√
2 Vbase
2 4160
= 9.01 Wb
= √
λrated = √
3 ωbase
3 (120π)
At a power output of 1050 kW and a speed of 828 r/min, ωm = 84.3 rad/sec,
Tmech = 1.25 × 104 N·m. Setting λDR = λrated gives
2
2
T
iQ =
= 242.1 A
3
poles
ΛPM
iD =
Ia =
2
2Ia,rated
+ i2Q = 76.2 A
i2D + i2Q
2
= 179.5 A
The terminal voltage is
Va
=
(Ra iD − ωe (LS −
L2m
2
LR )iQ )
= 2415 V, l-n = 4183 V, l-l
2
+ (Ra iQ + ωe LS iD )2
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The drive frequency can be found from
poles
ωme = ωm
= 337.2 rad/sec
2
ωe = ωme +
RaR
LR
iQ
iD
= 346.1 rad/sec
and
fe =
ω2
= 55.1 Hz
2π
part (b): The equivalent-circuit of Chapter 6 can be analyzed readily using
MATLAB as follows:
- All the reactances must be scaled from their 60-Hz values to 55.1 Hz.
- The rms input voltage must be set equal to 2415 V, line-to-neutral.
- The slip must be calculated based upon a synchronous speed of
ns = 60fe (2/poles) = 826 r/min.
If this is done, the equivalent circuit will give exactly the same results as those
of part (a).
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